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794 lines
28 KiB
794 lines
28 KiB
/*
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* rhizome.c
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*
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* author: John R. Douceur
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* date: 28 April 1997
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*
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* This source file provides functions that implement insertion, removal, and
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* search operations on the rhizome database. The code is object-oriented C,
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* transliterated from a C++ implementation.
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*
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* The rhizome is a database that stores patterns containing wildcards.
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* Each pattern defines a set of keys that it matches; if a pattern contains
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* N wildcards, then it matches 2^N keys. Since each pattern can match
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* multiple keys, it is possible for a given key to match multiple patterns
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* in the database. The rhizome requires that all patterns stored therein
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* have a strict hierarchical interrelationship. Two patterns may match no
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* common keys (in which case the patterns are said to be independent), or
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* one pattern may match all the keys matched by a second pattern as well as
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* additonal keys (in which case the second pattern is said to be more general
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* than the first, and the first more specific than the second). The database
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* will not accept two patterns which match some keys in common but each of
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* which also matches additional keys that the other does not.
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*
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* The database can be searched for patterns that match a given search key.
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* When the database is searched for a given key, the most specifically
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* matching pattern is found. If no patterns in the database match the key,
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* an appropriate indication is returned.
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*
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* None of the code or comments in this file needs to be understood by writers
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* of client code; all explanatory information for clients is found in the
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* associated header file, rhizome.h.
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*
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*/
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#include "precomp.h"
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#pragma hdrstop
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// The fields of the RhizomeNode structure are accessed through the following
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// macros. The first three are obvious; the subsequent three rely on an agreed
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// usage of the cdata array in the RhizomeNode. The first keybytes locations
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// of the cdata array are used to store the value field of the node; the second
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// keybytes locations store the mask field; and the third keybytes locations
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// store the imask field.
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//
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#define CHILDREN udata.branch.children
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#define REFERENCE udata.leaf.reference
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#define GODPARENT udata.leaf.godparent
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#define VALUE(pointer) (pointer->cdata)
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#define MASK(pointer) (pointer->cdata + rhizome->keybytes)
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#define IMASK(pointer) (pointer->cdata + 2 * rhizome->keybytes)
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// This macro allocates a new rhizome node structure. The size of the structure
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// is a function of the value of keybytes, since three bytes of information
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// need to be stored in the structure for each byte of pattern length. The
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// cdata array, which is the last field in the structure, is declared as a
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// having a single element, but this array will actually extend beyond the
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// defined end of the structure into additional space that is allocated for it
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// by the following macro.
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//
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#define NEW_RhizomeNode(_pa) \
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GpcAllocMem((_pa),\
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sizeof(RhizomeNode) + 3 * rhizome->keybytes - 1,\
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NAT_TAG_RHIZOME)/*;\
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TRACE(RHIZOME, *_pa, sizeof(RhizomeNode) + 3 * rhizome->keybytes - 1, "NEW_RhizomeNode")*/
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// This macro gets the indexed bit of the value, where the most-significant bit
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// is defined as bit 0.
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//
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#define BIT_OF(value, index) \
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(((value)[(index) >> 3] >> (7 - ((index) & 0x7))) & 0x1)
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// Following are prototypes for static functions that are used internally by
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// the implementation of the rhizome routines.
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static int
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node_insert(
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Rhizome *rhizome,
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RhizomeNode *new_leaf,
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RhizomeNode **ppoint,
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int prev_bit);
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static void
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node_remove(
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Rhizome *rhizome,
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RhizomeNode *leaf,
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RhizomeNode **ppoint);
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static RhizomeNode *
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replicate(
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Rhizome *rhizome,
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RhizomeNode *source,
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int pivot_bit);
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static void
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eliminate(
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Rhizome *rhizome,
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RhizomeNode *point);
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static void
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coalesce(
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Rhizome *rhizome,
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RhizomeNode **leaf_list,
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RhizomeNode *point);
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// Since this is not C++, the Rhizome structure is not self-constructing;
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// therefore, the following constructor code must be called on the Rhizome
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// structure after it is allocated. The argument keybits specifies the size
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// (in bits) of each pattern that will be stored in the database.
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//
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void
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constructRhizome(
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Rhizome *rhizome,
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int keybits)
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{
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rhizome->keybits = keybits;
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rhizome->keybytes = (keybits - 1) / 8 + 1;
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rhizome->root = 0;
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}
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// Since this is not C++, the Rhizome structure is not self-destructing;
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// therefore, the following destructor code must be called on the Rhizome
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// structure before it is deallocated.
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//
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// If the structure is non-empty, call coalesce() to eliminate
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// all branch nodes and to string leaf nodes into a list; then delete list.
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//
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void
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destructRhizome(
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Rhizome *rhizome)
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{
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RhizomeNode *leaf_list, *next;
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if (rhizome->root != 0)
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{
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leaf_list = 0;
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coalesce(rhizome, &leaf_list, rhizome->root);
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while (leaf_list != 0)
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{
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next = leaf_list->GODPARENT;
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GpcFreeMem(leaf_list, NAT_TAG_RHIZOME);
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leaf_list = next;
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}
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}
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}
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// This function searches the database for the pattern that most specifically
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// matches the given key. The key is passed as an array of bytes. When the
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// most specific match is found, the PatternHandle of that matching pattern is
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// returned. From the PatternHandle can be gotten the reference value via the
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// macro GetReferenceFromPatternHandle. If no pattern in the database is found
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// to match the key, then a value of 0 is returned as the PatternHandle.
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//
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PatternHandle
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searchRhizome(
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Rhizome *rhizome,
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char *key)
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{
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int index;
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RhizomeNode *point;
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// If tree is empty, search fails.
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if (rhizome->root == 0)
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{
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return 0;
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}
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// Otherwise, start at rhizome->root and navigate tree until reaching a leaf.
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point = rhizome->root;
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while (point->pivot_bit < rhizome->keybits)
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{
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point = point->CHILDREN[BIT_OF(key, point->pivot_bit)];
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}
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// Check value for match, one byte at a time. If any byte fails to match,
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// continue checking godparent with same byte; since previous bytes matched
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// godchild, they are guaranteed to match godparent also.
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index = 0;
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while (index < rhizome->keybytes)
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{
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if ((((key)[index]) & MASK(point)[index]) != VALUE(point)[index])
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{
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if (point->GODPARENT != 0)
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{
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point = point->GODPARENT;
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}
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else
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{
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return 0;
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}
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}
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else
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{
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index++;
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}
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}
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return point;
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}
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// This function inserts a new pattern into the database. The pattern is
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// specified by a value and a mask. Each bit of the mask determines whether
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// the bit position is specified or is a wildcard: A 1 in a mask bit indicates
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// that the value of that bit is specified by the pattern; a 0 indicates that
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// the value of that bit is a wildcard. If a mask bit is 1, then the
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// corresponding bit in the value field indicates the specified value of that
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// bit. Value and mask fields are passed as arrays of bytes.
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//
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// The client specifies a void pointer reference value to associate with the
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// pattern. When the pattern is installed, the insertRhizome function returns
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// a pointer to a PatternHandle.
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//
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// If the new pattern conflicts with a pattern already installed in the
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// database, meaning that the two patterns match some keys in common but each
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// also matches additional keys that the other does not, then the new pattern
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// is not inserted, and a value of 0 is returned as the PatternHandle.
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//
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PatternHandle
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insertRhizome(
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Rhizome *rhizome,
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char *value,
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char *mask,
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void *reference,
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ulong *status)
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{
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RhizomeNode *new_leaf;
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int index0, insert_status;
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*status = GPC_STATUS_SUCCESS;
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// Create new leaf and copy data into it; restrict set bits of value to
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// those set in mask, since later code assumes this is the case. Add new
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// leaf to reference table.
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NEW_RhizomeNode(&new_leaf);
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if (new_leaf == 0)
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{
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// Memory could not be allocated for this new node. Therefore, we
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// return an indication of failure to the client.
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*status = GPC_STATUS_RESOURCES;
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return 0;
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}
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for (index0 = 0; index0 < rhizome->keybytes; index0++)
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{
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VALUE(new_leaf)[index0] = value[index0] & mask[index0];
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MASK(new_leaf)[index0] = mask[index0];
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IMASK(new_leaf)[index0] = mask[index0];
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}
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new_leaf->REFERENCE = reference;
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new_leaf->pivot_bit = rhizome->keybits;
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new_leaf->GODPARENT = 0;
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// If tree is empty, leaf becomes first node; otherwise, attempt to insert
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// using recursive node_insert() routine. If new leaf conflicts with
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// existing leaf, node_insert() throws exception; then remove new leaf and
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// return failure code.
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if (rhizome->root == 0)
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{
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rhizome->root = new_leaf;
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}
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else
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{
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insert_status = node_insert(rhizome, new_leaf, &rhizome->root, -1);
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if (insert_status != GPC_STATUS_SUCCESS)
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{
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removeRhizome(rhizome, new_leaf);
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*status = GPC_STATUS_CONFLICT;
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return 0; // return null pointer
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};
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}
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return new_leaf;
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}
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// This function removes a pattern from the rhizome. The pattern is specified
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// by the PatternHandle that was returned by the insertRhizome function. No
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// checks are performed to insure that this is a valid handle.
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//
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void
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removeRhizome(
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Rhizome *rhizome,
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PatternHandle phandle)
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{
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// Call recursive node_remove() routine to remove all references to leaf;
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// then delete leaf.
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node_remove(rhizome, phandle, &rhizome->root);
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//TRACE(RHIZOME, rhizome, phandle, "removeRhizome")
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GpcFreeMem(phandle, NAT_TAG_RHIZOME);
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}
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// Insert new_leaf into subtree pointed to by *ppoint. Update *ppoint to point
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// to newly created nodes if necessary. Index of most recently examined bit
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// is given by prev_bit. The return value is a status code: Normally, it
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// returns GPC_STATUS_SUCCESS; if there is a conflict, then it returns NDIS_STATUS_CONFLICT;
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// if there is insufficient memory available to perform the insertion, then it
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// returns GPC_STATUS_RESOURCES.
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//
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static int
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node_insert(
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Rhizome *rhizome,
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RhizomeNode *new_leaf,
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RhizomeNode **ppoint,
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int prev_bit)
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{
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int index, index0, bit_value, insert_status;
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char sub, super;
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RhizomeNode *point, *child, *new_branch;
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// This routine has a recursive structure, but unnecessary recursions have
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// been replaced by iteration, in order to improve performance. This
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// recursion removal has introduced a forever loop which encloses the
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// entirety of the routine; looping back to the beginning of this loop is
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// thus the equivalent of recursing.
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while (1)
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{
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point = *ppoint;
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// Examine each bit index beginnig with that following last bit index
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// examined previously. Continue examining bits until pivot bit of
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// current node is reached (unless loop is terminated prematurely).
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for (index = prev_bit + 1; index < point->pivot_bit; index++)
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{
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// If some leaf in the current subtree cares about the value of the
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// current bit, and if the new leaf cares about the value of the
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// current bit, and these two leaves disagree about the value of
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// this bit, then a new branch node should be inserted here.
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if (BIT_OF(MASK(new_leaf), index) == 1 &&
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BIT_OF(MASK(point), index) == 1 &&
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BIT_OF(VALUE(new_leaf), index) != BIT_OF(VALUE(point), index))
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{
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// Create new branch node; insert into tree; and set fields.
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bit_value = BIT_OF(VALUE(new_leaf), index);
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NEW_RhizomeNode(&new_branch);
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if (new_branch == 0)
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{
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// Memory could not be allocated for this new node.
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// Therefore, we pass an indication of failure up the stack.
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return GPC_STATUS_RESOURCES;
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}
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*ppoint = new_branch;
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for (index0 = 0; index0 < rhizome->keybytes; index0++)
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{
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VALUE(new_branch)[index0] =
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VALUE(point)[index0] | VALUE(new_leaf)[index0];
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MASK(new_branch)[index0] =
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MASK(point)[index0] | MASK(new_leaf)[index0];
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IMASK(new_branch)[index0] =
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IMASK(point)[index0] & IMASK(new_leaf)[index0];
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}
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// Pivot bit of new branch node is the bit that inspired the
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// creation of this branch.
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new_branch->pivot_bit = index;
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// The earlier subtree becomes the child whose bit disagreed
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// with that of the new leaf.
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new_branch->CHILDREN[1 - bit_value] = point;
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// If every leaf in the subtree cares about the value of this
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// bit, then we can insert the new leaf as the other child of
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// this branch.
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if (BIT_OF(IMASK(point), index) == 1)
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{
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// Insert new leaf here and return.
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new_branch->CHILDREN[bit_value] = new_leaf;
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return GPC_STATUS_SUCCESS;
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}
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// Otherwise, at least one leaf in the earlier subtree does not
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// care about the value of this bit. Copy all such leaves
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// (and necessary branches) to the other child of the new
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// branch node.
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child = replicate(rhizome, point, index);
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if (child == 0)
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{
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// Memory could not be allocated for the replica.
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// Therefore, we remove the new node from the structure,
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// delete the new node, and pass an indication of failure
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// up the stack.
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*ppoint = point;
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GpcFreeMem(new_branch, NAT_TAG_RHIZOME);
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return GPC_STATUS_RESOURCES;
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}
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new_branch->CHILDREN[bit_value] = child;
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// Continue search on newly copied subtree.
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ppoint = &new_branch->CHILDREN[bit_value];
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point = *ppoint;
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}
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}
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// All bits have been examined up to the pivot bit of the current node.
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// If this node is a leaf, then we have found a leaf with which the new
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// leaf has no disagreements over bit values.
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if (point->pivot_bit >= rhizome->keybits)
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{
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// Loop up the chain of godparents until one of the four cases
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// below causes an exit from the subroutine.
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while (1)
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{
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// Case 1: We have reached the end of the godparent chain.
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if (point == 0)
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{
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// Insert new leaf at this point and return.
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*ppoint = new_leaf;
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return GPC_STATUS_SUCCESS;
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}
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// Case 2: We discover that we have already inserted this leaf
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// at the appropriate location. This can happen because two
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// leaves in separate parts of the tree may have a common god-
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// ancestor, and a leaf which is a further god-ancestor of that
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// leaf will be reached more than once. Since the first
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// occasion inserted the leaf, the second one can return without
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// performing any action.
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if (point == new_leaf)
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{
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return GPC_STATUS_SUCCESS;
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}
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// Compare mask bits of the new leaf to the current leaf.
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sub = 0;
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super = 0;
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for (index = 0; index < rhizome->keybytes; index++)
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{
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sub |= MASK(new_leaf)[index] & ~MASK(point)[index];
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super |= ~MASK(new_leaf)[index] & MASK(point)[index];
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}
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// Case 3: The new leaf cares about at least one bit that the
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// current leaf does not; and the current leaf does not care
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// about any bits that the new leaf does not; thus, the new leaf
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// should be a godchild of the current leaf.
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if (sub != 0 && super == 0)
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{
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// Update imask field of new leaf; insert into chain;
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// and return.
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for (index0 = 0; index0 < rhizome->keybytes; index0++)
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{
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IMASK(new_leaf)[index0] &= IMASK(point)[index0];
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}
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new_leaf->GODPARENT = point;
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*ppoint = new_leaf;
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return GPC_STATUS_SUCCESS;
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}
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// Case 4: Either the new leaf has the same value and mask as
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// the current leaf, or there is a hierarchy conflict between
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// the two leaves. In either case, terminate the insertion
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// process and clean up (in insert() routine) anything done
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// already.
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if (sub != 0 || super == 0)
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{
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return GPC_STATUS_CONFLICT;
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}
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// None of the above cases occurred; thus, the new leaf should
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// be a god-ancestor of the current leaf. Update the imask
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// field of the current leaf, and continue with godparent of
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// current leaf.
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for (index0 = 0; index0 < rhizome->keybytes; index0++)
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{
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IMASK(point)[index0] &= IMASK(new_leaf)[index0];
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}
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ppoint = &point->GODPARENT;
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point = *ppoint;
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}
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}
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// The current node is not a leaf node. Thus, we recurse on one or both
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// of the child nodes of the current node. First, update the fields of
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// the current node to reflect the insertion of the new leaf into the
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// subtree.
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for (index0 = 0; index0 < rhizome->keybytes; index0++)
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{
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VALUE(point)[index0] |= VALUE(new_leaf)[index0];
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MASK(point)[index0] |= MASK(new_leaf)[index0];
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IMASK(point)[index0] &= IMASK(new_leaf)[index0];
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}
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// If the new leaf doesn't care about the value of the pivot bit of the
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// current leaf, then we must recurse on both children. We can only
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// replace a single recursive call with iteration, so we perform a true
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// recursion in this case, and we recurse on child 1.
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if (BIT_OF(MASK(new_leaf), point->pivot_bit) == 0)
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{
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insert_status =
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node_insert(rhizome, new_leaf, &point->CHILDREN[1],
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point->pivot_bit);
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if (insert_status != GPC_STATUS_SUCCESS)
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{
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return insert_status;
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}
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}
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// Update the values of prev_bit and ppoint to reflect the same
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// conditions that would hold in a recursive call. The pseudo-recursion
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// is performed on the bit indicated by the value of the pivot bit of
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// the new leaf. If the new leaf does not care about this bit, then
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|
// this value will be a 0, and we recursed on child 1 above. If the new
|
|
// leaf does care about the value of this bit, then we continue down the
|
|
// appropriate path.
|
|
prev_bit = point->pivot_bit;
|
|
ppoint = &point->CHILDREN[BIT_OF(VALUE(new_leaf), point->pivot_bit)];
|
|
}
|
|
}
|
|
|
|
// Remove references to leaf from subtree pointed to by *ppoint. Update *ppoint
|
|
// if necessary due to removal of branch nodes.
|
|
//
|
|
static void
|
|
node_remove(
|
|
Rhizome *rhizome,
|
|
RhizomeNode *leaf,
|
|
RhizomeNode **ppoint)
|
|
{
|
|
int pivot_bit, bit_value, index0;
|
|
RhizomeNode *point, *child, *child0, *child1;
|
|
point = *ppoint;
|
|
pivot_bit = point->pivot_bit;
|
|
if (pivot_bit < rhizome->keybits)
|
|
{
|
|
// The current node is a branch node.
|
|
if (BIT_OF(MASK(leaf), pivot_bit) == 1)
|
|
{
|
|
// The leaf to be removed cares about this node's pivot bit;
|
|
// therefore, we need only recurse on one of the current node's
|
|
// children.
|
|
bit_value = BIT_OF(VALUE(leaf), pivot_bit);
|
|
node_remove(rhizome, leaf, &point->CHILDREN[bit_value]);
|
|
child = point->CHILDREN[bit_value];
|
|
if (child != 0 && BIT_OF(MASK(child), pivot_bit) == 1)
|
|
{
|
|
// Some leaf in the same subtree as the removed leaf cares about
|
|
// the value of this node's pivot bit; therefore, this node
|
|
// still has reason to exist. Update its fields to reflect the
|
|
// change in one of its subtrees.
|
|
child0 = point->CHILDREN[0];
|
|
child1 = point->CHILDREN[1];
|
|
for (index0 = 0; index0 < rhizome->keybytes; index0++)
|
|
{
|
|
VALUE(point)[index0] =
|
|
VALUE(child0)[index0] | VALUE(child1)[index0];
|
|
MASK(point)[index0] =
|
|
MASK(child0)[index0] | MASK(child1)[index0];
|
|
IMASK(point)[index0] =
|
|
IMASK(child0)[index0] & IMASK(child1)[index0];
|
|
}
|
|
}
|
|
else
|
|
{
|
|
// No leaf in the same subtree as the removed leaf cares about
|
|
// the value of this node's pivot bit; therefore, there is no
|
|
// longer any reason for this node to exist. Have the other
|
|
// subtree take the current node's place in the tree; call
|
|
// remove() to remove the unneeded subtree; and delete the
|
|
// current node.
|
|
*ppoint = point->CHILDREN[1 - bit_value];
|
|
if (child != 0)
|
|
{
|
|
eliminate(rhizome, child);
|
|
}
|
|
GpcFreeMem(point, NAT_TAG_RHIZOME);
|
|
}
|
|
}
|
|
else
|
|
{
|
|
// The leaf to be removed does not care about this node's pivot bit;
|
|
// therefore, we must recurse on both of the current node's
|
|
// children. This node must still be necessary, since we have not
|
|
// removed any leaf which cares about this node's value. So we
|
|
// update its fields to reflect the change in its two subtrees.
|
|
node_remove(rhizome, leaf, &point->CHILDREN[0]);
|
|
node_remove(rhizome, leaf, &point->CHILDREN[1]);
|
|
child0 = point->CHILDREN[0];
|
|
child1 = point->CHILDREN[1];
|
|
for (index0 = 0; index0 < rhizome->keybytes; index0++)
|
|
{
|
|
VALUE(point)[index0] =
|
|
VALUE(child0)[index0] | VALUE(child1)[index0];
|
|
MASK(point)[index0] =
|
|
MASK(child0)[index0] | MASK(child1)[index0];
|
|
IMASK(point)[index0] =
|
|
IMASK(child0)[index0] & IMASK(child1)[index0];
|
|
}
|
|
}
|
|
}
|
|
else
|
|
{
|
|
// The current node is a leaf node.
|
|
if (point == leaf)
|
|
{
|
|
// The current node is the leaf to be removed; therefore, remove it
|
|
// from chain of godparents.
|
|
*ppoint = leaf->GODPARENT;
|
|
}
|
|
else
|
|
{
|
|
// The current node is not leaf to be removed. Therefore, if this
|
|
// node has a godparent, then recurse on that godparent. If this
|
|
// node does not have a godparent, then the to-be-removed leaf
|
|
// either already was removed by a different path, or it was never
|
|
// inserted to begin with. The latter might be the case if remove()
|
|
// was called from the catch clause of insert().
|
|
if (point->GODPARENT != 0)
|
|
{
|
|
node_remove(rhizome, leaf, &point->GODPARENT);
|
|
}
|
|
// We are now popping back up the recursion stack. If this node
|
|
// does not have a godparent, or if it did but it does not anymore,
|
|
// then initialize imask to mask; otherwise, copy the godparent's
|
|
// value of imask. Since the godparent chain follows a strict
|
|
// hierarchy, and since imask is formed by successive conjunction,
|
|
// all leaves in any given godparent chain will have the same value
|
|
// of imask, namely the mask value of the highest god-ancestor.
|
|
if (point->GODPARENT == 0)
|
|
{
|
|
for (index0 = 0; index0 < rhizome->keybytes; index0++)
|
|
{
|
|
IMASK(point)[index0] = MASK(point)[index0];
|
|
}
|
|
}
|
|
else
|
|
{
|
|
for (index0 = 0; index0 < rhizome->keybytes; index0++)
|
|
{
|
|
IMASK(point)[index0] = IMASK(point->GODPARENT)[index0];
|
|
}
|
|
}
|
|
}
|
|
}
|
|
}
|
|
|
|
// Replicate all nodes in a subtree which do not care about the value of
|
|
// pivot_bit.
|
|
//
|
|
static RhizomeNode *
|
|
replicate(
|
|
Rhizome *rhizome,
|
|
RhizomeNode *source,
|
|
int pivot_bit)
|
|
{
|
|
int index0, current_bit;
|
|
RhizomeNode *new_node, *child0, *child1;
|
|
// If this routine were fully recursive, the following while statement
|
|
// would be an if statement. However, recursion has been replaced by
|
|
// iteration where possible, so the following code loops until bottoming
|
|
// out when a leaf node is reached.
|
|
while (source->pivot_bit < rhizome->keybits)
|
|
{
|
|
if (BIT_OF(IMASK(source->CHILDREN[0]), pivot_bit) == 0)
|
|
{
|
|
if (BIT_OF(IMASK(source->CHILDREN[1]), pivot_bit) == 0)
|
|
{
|
|
// Both subtrees contain leaves which do not care about the
|
|
// pivot bit; therefore, we may need to make a copy of the
|
|
// current node. It is not guaranteed that we need to make
|
|
// a copy, since it may be a common leaf in both subtrees
|
|
// that does not care about the pivot bit. This may happen
|
|
// for a leaf which is a godparent of two leaves, one in each
|
|
// subtree. Recurse on each child and examine results.
|
|
child0 = replicate(rhizome, source->CHILDREN[0], pivot_bit);
|
|
if (child0 == 0)
|
|
{
|
|
// Memory could not be allocated for the child replica.
|
|
// Therefore, we abort the replication process and pass an
|
|
// indication of failure op the stack.
|
|
return 0;
|
|
}
|
|
child1 = replicate(rhizome, source->CHILDREN[1], pivot_bit);
|
|
if (child1 == 0)
|
|
{
|
|
// Memory could not be allocated for the child replica.
|
|
// Therefore, we abort the replication process, eliminate
|
|
// the other child replica, and pass an indication of
|
|
// failure op the stack.
|
|
eliminate(rhizome, child0);
|
|
return 0; // return null pointer
|
|
}
|
|
current_bit = source->pivot_bit;
|
|
if (BIT_OF(MASK(child0), current_bit) == 1)
|
|
{
|
|
if (BIT_OF(MASK(child1), current_bit) == 1)
|
|
{
|
|
// Both replicated child subtrees contain leaves which
|
|
// care about the current node's bit. Since any node
|
|
// which is a godparent of nodes in both subtrees could
|
|
// not possibly care about the current node's bit, we
|
|
// know that we need to make a copy of the current node.
|
|
NEW_RhizomeNode(&new_node);
|
|
if (new_node == 0)
|
|
{
|
|
// Memory could not be allocated for this new node.
|
|
// Therefore, we have to eliminate both children
|
|
// and pass an indication of failure up the stack.
|
|
eliminate(rhizome, child0);
|
|
eliminate(rhizome, child1);
|
|
return 0; // return null pointer
|
|
}
|
|
for (index0 = 0; index0 < rhizome->keybytes; index0++)
|
|
{
|
|
VALUE(new_node)[index0] =
|
|
VALUE(child0)[index0] | VALUE(child1)[index0];
|
|
MASK(new_node)[index0] =
|
|
MASK(child0)[index0] | MASK(child1)[index0];
|
|
IMASK(new_node)[index0] =
|
|
IMASK(child0)[index0] & IMASK(child1)[index0];
|
|
}
|
|
new_node->pivot_bit = current_bit;
|
|
new_node->CHILDREN[0] = child0;
|
|
new_node->CHILDREN[1] = child1;
|
|
return new_node;
|
|
}
|
|
// Child 0's subtree contains a leaf that cares about the
|
|
// current bit; however, child 1's subtree does not. Thus,
|
|
// all leaves which are in child 1's subtree are also in
|
|
// child 0's subtree, so we only need to keep the latter.
|
|
// We therefore eliminate child 1's subtree, and we return
|
|
// child 0 as the new subtree at this location, since we
|
|
// do not need to create a new branch node here.
|
|
eliminate(rhizome, child1);
|
|
return child0;
|
|
}
|
|
// Child 0's subtree does not contain a leaf that cares about
|
|
// the current node's bit. Thus, all leaves which are in child
|
|
// 0's subtree are also in child 1's subtree, so we only need to
|
|
// keep the latter. We therefore eliminate child 0's subtree,
|
|
// and we return child 1 as the new subtree at this location,
|
|
// since we do not need to create a new branch node here.
|
|
eliminate(rhizome, child0);
|
|
return child1;
|
|
}
|
|
// Child 0's subtree contains a leaf which does not care about the
|
|
// pivot bit; however, child 1's subtree does not. Therefore, we
|
|
// recurse on child 0. Rather than truly recursing, we update the
|
|
// value of source and iterate once through the while loop.
|
|
source = source->CHILDREN[0];
|
|
}
|
|
else
|
|
{
|
|
// Child 0's subtree does not contain a leaf which does not care
|
|
// about the pivot bit. Child 1's subtree must contain such a leaf,
|
|
// since the current node's subtree contains such a leaf. Thus, we
|
|
// recurse on child 1. Rather than truly recursing, we update the
|
|
// value of source and iterate once through the while loop.
|
|
source = source->CHILDREN[1];
|
|
}
|
|
}
|
|
// A leaf node has been reached. We now iterate through the godparents of
|
|
// the leaf until we find one which does not care about the pivot bit.
|
|
// Once we find it, we know that all godparents of that leaf also do not
|
|
// care about the pivot bit, since the godparents are arranged in a strict
|
|
// hierarchy. We thus return the first leaf found which does not care about
|
|
// the value of the pivot bit.
|
|
while (BIT_OF(MASK(source), pivot_bit) == 1)
|
|
{
|
|
source = source->GODPARENT;
|
|
}
|
|
return source;
|
|
}
|
|
|
|
// Eliminate an entire subtree.
|
|
//
|
|
static void
|
|
eliminate(
|
|
Rhizome *rhizome,
|
|
RhizomeNode *point)
|
|
{
|
|
RhizomeNode *child;
|
|
// Partial recursion removal. The while loop takes the place of one of the
|
|
// recursive calls to eliminate(). We eliminate each node and recursively
|
|
// eleminate each subtree under the node. We do not eliminate leaves, since
|
|
// there is only one copy of each leaf stored in the entire structure.
|
|
while (point->pivot_bit < rhizome->keybits)
|
|
{
|
|
eliminate(rhizome, point->CHILDREN[0]);
|
|
child = point->CHILDREN[1];
|
|
GpcFreeMem(point, NAT_TAG_RHIZOME);
|
|
point = child;
|
|
}
|
|
}
|
|
|
|
// Coalesce leaves of subtree into a linked list and eliminate subtree. This
|
|
// routine is called by the destructor so that it can deallocate the leaf nodes
|
|
// after the branch nodes are eliminated.
|
|
//
|
|
static void
|
|
coalesce(
|
|
Rhizome *rhizome,
|
|
RhizomeNode **leaf_list,
|
|
RhizomeNode *point)
|
|
{
|
|
RhizomeNode *child, *godparent;
|
|
// Partial recursion removal. This while loop takes the place of one of
|
|
// the recursive calls to coalesce(). This performs an inorder traversal.
|
|
// We delete each branch node after we have visited it, just as in the
|
|
// eliminate() routine.
|
|
while (point->pivot_bit < rhizome->keybits && point->pivot_bit >= 0)
|
|
{
|
|
coalesce(rhizome, leaf_list, point->CHILDREN[0]);
|
|
child = point->CHILDREN[1];
|
|
GpcFreeMem(point, NAT_TAG_RHIZOME);
|
|
point = child;
|
|
}
|
|
// Once we have found a leaf, we search through the chain of godparents,
|
|
// adding to the list each leaf node that is not already in the list.
|
|
// A pivot_bit of -1 indicates that the leaf is already in the list.
|
|
// If a leaf is in the list, then so are all of its godparents.
|
|
while (point != 0 && point->pivot_bit >= 0)
|
|
{
|
|
godparent = point->GODPARENT;
|
|
point->pivot_bit = -1;
|
|
point->GODPARENT = *leaf_list;
|
|
*leaf_list = point;
|
|
point = godparent;
|
|
}
|
|
}
|