377 lines
13 KiB
Perl
377 lines
13 KiB
Perl
#----------------------------------------------------------------------
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#
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# PerfectHash.pm
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# Perl module that constructs minimal perfect hash functions
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#
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# This code constructs a minimal perfect hash function for the given
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# set of keys, using an algorithm described in
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# "An optimal algorithm for generating minimal perfect hash functions"
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# by Czech, Havas and Majewski in Information Processing Letters,
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# 43(5):256-264, October 1992.
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# This implementation is loosely based on NetBSD's "nbperf",
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# which was written by Joerg Sonnenberger.
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#
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# The resulting hash function is perfect in the sense that if the presented
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# key is one of the original set, it will return the key's index in the set
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# (in range 0..N-1). However, the caller must still verify the match,
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# as false positives are possible. Also, the hash function may return
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# values that are out of range (negative or >= N), due to summing unrelated
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# hashtable entries. This indicates that the presented key is definitely
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# not in the set.
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#
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#
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# Portions Copyright (c) 1996-2020, PostgreSQL Global Development Group
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# Portions Copyright (c) 1994, Regents of the University of California
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#
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# src/tools/PerfectHash.pm
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#
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#----------------------------------------------------------------------
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package PerfectHash;
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use strict;
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use warnings;
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# At runtime, we'll compute two simple hash functions of the input key,
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# and use them to index into a mapping table. The hash functions are just
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# multiply-and-add in uint32 arithmetic, with different multipliers and
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# initial seeds. All the complexity in this module is concerned with
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# selecting hash parameters that will work and building the mapping table.
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# We support making case-insensitive hash functions, though this only
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# works for a strict-ASCII interpretation of case insensitivity,
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# ie, A-Z maps onto a-z and nothing else.
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my $case_fold = 0;
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#
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# Construct a C function implementing a perfect hash for the given keys.
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# The C function definition is returned as a string.
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#
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# The keys should be passed as an array reference. They can be any set
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# of Perl strings; it is caller's responsibility that there not be any
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# duplicates. (Note that the "strings" can be binary data, but hashing
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# e.g. OIDs has endianness hazards that callers must overcome.)
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#
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# The name to use for the function is specified as the second argument.
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# It will be a global function by default, but the caller may prepend
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# "static " to the result string if it wants a static function.
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#
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# Additional options can be specified as keyword-style arguments:
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#
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# case_fold => bool
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# If specified as true, the hash function is case-insensitive, for the
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# limited idea of case-insensitivity explained above.
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#
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# fixed_key_length => N
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# If specified, all keys are assumed to have length N bytes, and the
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# hash function signature will be just "int f(const void *key)"
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# rather than "int f(const void *key, size_t keylen)".
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#
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sub generate_hash_function
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{
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my ($keys_ref, $funcname, %options) = @_;
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# It's not worth passing this around as a parameter; just use a global.
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$case_fold = $options{case_fold} || 0;
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# Try different hash function parameters until we find a set that works
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# for these keys. The multipliers are chosen to be primes that are cheap
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# to calculate via shift-and-add, so don't change them without care.
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# (Commonly, random seeds are tried, but we want reproducible results
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# from this program so we don't do that.)
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my $hash_mult1 = 31;
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my $hash_mult2;
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my $hash_seed1;
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my $hash_seed2;
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my @subresult;
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FIND_PARAMS:
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foreach (127, 257, 521, 1033, 2053)
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{
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$hash_mult2 = $_; # "foreach $hash_mult2" doesn't work
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for ($hash_seed1 = 0; $hash_seed1 < 10; $hash_seed1++)
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{
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for ($hash_seed2 = 0; $hash_seed2 < 10; $hash_seed2++)
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{
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@subresult = _construct_hash_table(
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$keys_ref, $hash_mult1, $hash_mult2,
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$hash_seed1, $hash_seed2);
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last FIND_PARAMS if @subresult;
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}
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}
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}
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# Choke if we couldn't find a workable set of parameters.
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die "failed to generate perfect hash" if !@subresult;
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# Extract info from _construct_hash_table's result array.
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my $elemtype = $subresult[0];
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my @hashtab = @{ $subresult[1] };
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my $nhash = scalar(@hashtab);
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# OK, construct the hash function definition including the hash table.
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my $f = '';
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$f .= sprintf "int\n";
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if (defined $options{fixed_key_length})
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{
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$f .= sprintf "%s(const void *key)\n{\n", $funcname;
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}
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else
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{
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$f .= sprintf "%s(const void *key, size_t keylen)\n{\n", $funcname;
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}
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$f .= sprintf "\tstatic const %s h[%d] = {\n", $elemtype, $nhash;
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for (my $i = 0; $i < $nhash; $i++)
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{
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$f .= sprintf "%s%6d,%s",
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($i % 8 == 0 ? "\t\t" : " "),
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$hashtab[$i],
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($i % 8 == 7 ? "\n" : "");
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}
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$f .= sprintf "\n" if ($nhash % 8 != 0);
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$f .= sprintf "\t};\n\n";
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$f .= sprintf "\tconst unsigned char *k = (const unsigned char *) key;\n";
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$f .= sprintf "\tsize_t\t\tkeylen = %d;\n", $options{fixed_key_length}
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if (defined $options{fixed_key_length});
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$f .= sprintf "\tuint32\t\ta = %d;\n", $hash_seed1;
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$f .= sprintf "\tuint32\t\tb = %d;\n\n", $hash_seed2;
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$f .= sprintf "\twhile (keylen--)\n\t{\n";
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$f .= sprintf "\t\tunsigned char c = *k++";
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$f .= sprintf " | 0x20" if $case_fold; # see comment below
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$f .= sprintf ";\n\n";
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$f .= sprintf "\t\ta = a * %d + c;\n", $hash_mult1;
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$f .= sprintf "\t\tb = b * %d + c;\n", $hash_mult2;
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$f .= sprintf "\t}\n";
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$f .= sprintf "\treturn h[a %% %d] + h[b %% %d];\n", $nhash, $nhash;
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$f .= sprintf "}\n";
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return $f;
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}
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# Calculate a hash function as the run-time code will do.
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#
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# If we are making a case-insensitive hash function, we implement that
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# by OR'ing 0x20 into each byte of the key. This correctly transforms
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# upper-case ASCII into lower-case ASCII, while not changing digits or
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# dollar signs. (It does change '_', as well as other characters not
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# likely to appear in keywords; this has little effect on the hash's
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# ability to discriminate keywords.)
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sub _calc_hash
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{
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my ($key, $mult, $seed) = @_;
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my $result = $seed;
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for my $c (split //, $key)
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{
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my $cn = ord($c);
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$cn |= 0x20 if $case_fold;
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$result = ($result * $mult + $cn) % 4294967296;
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}
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return $result;
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}
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# Attempt to construct a mapping table for a minimal perfect hash function
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# for the given keys, using the specified hash parameters.
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#
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# Returns an array containing the mapping table element type name as the
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# first element, and a ref to an array of the table values as the second.
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#
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# Returns an empty array on failure; then caller should choose different
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# hash parameter(s) and try again.
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sub _construct_hash_table
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{
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my ($keys_ref, $hash_mult1, $hash_mult2, $hash_seed1, $hash_seed2) = @_;
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my @keys = @{$keys_ref};
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# This algorithm is based on a graph whose edges correspond to the
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# keys and whose vertices correspond to entries of the mapping table.
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# A key's edge links the two vertices whose indexes are the outputs of
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# the two hash functions for that key. For K keys, the mapping
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# table must have at least 2*K+1 entries, guaranteeing that there's at
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# least one unused entry. (In principle, larger mapping tables make it
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# easier to find a workable hash and increase the number of inputs that
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# can be rejected due to touching unused hashtable entries. In practice,
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# neither effect seems strong enough to justify using a larger table.)
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my $nedges = scalar @keys; # number of edges
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my $nverts = 2 * $nedges + 1; # number of vertices
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# However, it would be very bad if $nverts were exactly equal to either
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# $hash_mult1 or $hash_mult2: effectively, that hash function would be
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# sensitive to only the last byte of each key. Cases where $nverts is a
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# multiple of either multiplier likewise lose information. (But $nverts
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# can't actually divide them, if they've been intelligently chosen as
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# primes.) We can avoid such problems by adjusting the table size.
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while ($nverts % $hash_mult1 == 0
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|| $nverts % $hash_mult2 == 0)
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{
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$nverts++;
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}
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# Initialize the array of edges.
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my @E = ();
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foreach my $kw (@keys)
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{
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# Calculate hashes for this key.
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# The hashes are immediately reduced modulo the mapping table size.
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my $hash1 = _calc_hash($kw, $hash_mult1, $hash_seed1) % $nverts;
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my $hash2 = _calc_hash($kw, $hash_mult2, $hash_seed2) % $nverts;
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# If the two hashes are the same for any key, we have to fail
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# since this edge would itself form a cycle in the graph.
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return () if $hash1 == $hash2;
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# Add the edge for this key.
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push @E, { left => $hash1, right => $hash2 };
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}
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# Initialize the array of vertices, giving them all empty lists
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# of associated edges. (The lists will be hashes of edge numbers.)
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my @V = ();
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for (my $v = 0; $v < $nverts; $v++)
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{
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push @V, { edges => {} };
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}
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# Insert each edge in the lists of edges connected to its vertices.
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for (my $e = 0; $e < $nedges; $e++)
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{
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my $v = $E[$e]{left};
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$V[$v]{edges}->{$e} = 1;
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$v = $E[$e]{right};
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$V[$v]{edges}->{$e} = 1;
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}
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# Now we attempt to prove the graph acyclic.
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# A cycle-free graph is either empty or has some vertex of degree 1.
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# Removing the edge attached to that vertex doesn't change this property,
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# so doing that repeatedly will reduce the size of the graph.
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# If the graph is empty at the end of the process, it was acyclic.
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# We track the order of edge removal so that the next phase can process
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# them in reverse order of removal.
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my @output_order = ();
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# Consider each vertex as a possible starting point for edge-removal.
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for (my $startv = 0; $startv < $nverts; $startv++)
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{
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my $v = $startv;
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# If vertex v is of degree 1 (i.e. exactly 1 edge connects to it),
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# remove that edge, and then consider the edge's other vertex to see
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# if it is now of degree 1. The inner loop repeats until reaching a
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# vertex not of degree 1.
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while (scalar(keys(%{ $V[$v]{edges} })) == 1)
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{
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# Unlink its only edge.
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my $e = (keys(%{ $V[$v]{edges} }))[0];
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delete($V[$v]{edges}->{$e});
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# Unlink the edge from its other vertex, too.
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my $v2 = $E[$e]{left};
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$v2 = $E[$e]{right} if ($v2 == $v);
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delete($V[$v2]{edges}->{$e});
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# Push e onto the front of the output-order list.
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unshift @output_order, $e;
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# Consider v2 on next iteration of inner loop.
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$v = $v2;
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}
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}
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# We succeeded only if all edges were removed from the graph.
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return () if (scalar(@output_order) != $nedges);
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# OK, build the hash table of size $nverts.
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my @hashtab = (0) x $nverts;
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# We need a "visited" flag array in this step, too.
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my @visited = (0) x $nverts;
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# The goal is that for any key, the sum of the hash table entries for
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# its first and second hash values is the desired output (i.e., the key
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# number). By assigning hash table values in the selected edge order,
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# we can guarantee that that's true. This works because the edge first
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# removed from the graph (and hence last to be visited here) must have
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# at least one vertex it shared with no other edge; hence it will have at
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# least one vertex (hashtable entry) still unvisited when we reach it here,
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# and we can assign that unvisited entry a value that makes the sum come
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# out as we wish. By induction, the same holds for all the other edges.
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foreach my $e (@output_order)
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{
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my $l = $E[$e]{left};
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my $r = $E[$e]{right};
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if (!$visited[$l])
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{
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# $hashtab[$r] might be zero, or some previously assigned value.
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$hashtab[$l] = $e - $hashtab[$r];
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}
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else
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{
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die "oops, doubly used hashtab entry" if $visited[$r];
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# $hashtab[$l] might be zero, or some previously assigned value.
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$hashtab[$r] = $e - $hashtab[$l];
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}
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# Now freeze both of these hashtab entries.
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$visited[$l] = 1;
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$visited[$r] = 1;
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}
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# Detect range of values needed in hash table.
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my $hmin = $nedges;
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my $hmax = 0;
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for (my $v = 0; $v < $nverts; $v++)
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{
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$hmin = $hashtab[$v] if $hashtab[$v] < $hmin;
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$hmax = $hashtab[$v] if $hashtab[$v] > $hmax;
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}
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# Choose width of hashtable entries. In addition to the actual values,
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# we need to be able to store a flag for unused entries, and we wish to
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# have the property that adding any other entry value to the flag gives
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# an out-of-range result (>= $nedges).
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my $elemtype;
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my $unused_flag;
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if ( $hmin >= -0x7F
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&& $hmax <= 0x7F
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&& $hmin + 0x7F >= $nedges)
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{
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# int8 will work
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$elemtype = 'int8';
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$unused_flag = 0x7F;
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}
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elsif ($hmin >= -0x7FFF
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&& $hmax <= 0x7FFF
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&& $hmin + 0x7FFF >= $nedges)
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{
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# int16 will work
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$elemtype = 'int16';
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$unused_flag = 0x7FFF;
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}
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elsif ($hmin >= -0x7FFFFFFF
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&& $hmax <= 0x7FFFFFFF
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&& $hmin + 0x3FFFFFFF >= $nedges)
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{
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# int32 will work
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$elemtype = 'int32';
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$unused_flag = 0x3FFFFFFF;
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}
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else
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{
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die "hash table values too wide";
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}
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# Set any unvisited hashtable entries to $unused_flag.
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for (my $v = 0; $v < $nverts; $v++)
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{
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$hashtab[$v] = $unused_flag if !$visited[$v];
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}
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return ($elemtype, \@hashtab);
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}
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1;
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