NAME

Set::IntSpan - Manages sets of integers

SYNOPSIS

use Set::IntSpan qw(grep_set map_set grep_spans map_spans);

$Set::IntSpan::Empty_String = $string;

$set    = new   Set::IntSpan $set_spec;
$set    = new   Set::IntSpan @set_specs;
$valid  = valid Set::IntSpan $run_list;
$set    = copy  $set $set_spec;

$run_list = run_list $set;
@elements = elements $set;
@sets     = sets     $set;
@spans    = spans    $set;

$u_set = union      $set $set_spec;
$i_set = intersect  $set $set_spec;
$x_set = xor        $set $set_spec;
$d_set = diff       $set $set_spec;
$c_set = complement $set;

$set->U($set_spec);   # Union
$set->I($set_spec);   # Intersect
$set->X($set_spec);   # Xor
$set->D($set_spec);   # Diff
$set->C;              # Complement

equal      $set $set_spec
equivalent $set $set_spec
superset   $set $set_spec
subset     $set $set_spec

$n = cardinality $set;
$n = size        $set;

empty      $set
finite     $set
neg_inf    $set
pos_inf    $set
infinite   $set
universal  $set

member     $set $n;
insert     $set $n;
remove     $set $n;

$min = min $set;
$max = max $set;

$holes   = holes $set;
$cover   = cover $set;
$inset   = inset $set $n;
$smaller = trim  $set $n;
$bigger  = pad   $set $n;

$subset  = grep_set 	{ ... } $set;
$mapset  = map_set  	{ ... } $set;

$subset  = grep_spans { ... } $set;
$mapset  = map_spans  { ... } $set;

for ($element=$set->first; defined $element; $element=$set->next) { ... }
for ($element=$set->last ; defined $element; $element=$set->prev) { ... }

$element = $set->start($n);
$element = $set->current;

$n       = $set->at($i);
$slice   = $set->slice($from, $to);
$i       = $set->ord($n);

Operator overloads

$u_set =  $set + $set_spec;   # union
$i_set =  $set * $set_spec;	# intersect
$x_set =  $set ^ $set_spec;	# xor
$d_set =  $set - $set_spec;	# diff
$c_set = ~$set;               # complement

$set += $set_spec;            # union
$set *= $set_spec;		# intersect
$set ^= $set_spec;		# xor
$set -= $set_spec;		# diff

$set eq $set_spec		# equal
$set ne $set_spec		# not equal
$set le $set_spec		# subset
$set lt $set_spec		# proper subset
$set ge $set_spec		# superset
$set gt $set_spec		# proper superset

# compare sets by cardinality
$set1 ==  $set2
$set1 !=  $set2
$set1 <=  $set2
$set1 <   $set2
$set1 >=  $set2
$set1 >   $set2
$set1 <=> $set2

# compare cardinality of set to an integer
$set1 ==  $n
$set1 !=  $n
$set1 <=  $n
$set1 <   $n
$set1 >=  $n
$set1 >   $n
$set1 <=> $n

@sorted = sort @sets;         # sort sets by cardinality

if ($set) { ... }             # true if $set is not empty

print "$set\n";               # stringizes to the run list

EXPORTS

@EXPORT

Nothing

@EXPORT_OK

grep_set, map_set, grep_spans, map_spans

DESCRIPTION

Set::IntSpan manages sets of integers. It is optimized for sets that have long runs of consecutive integers. These arise, for example, in .newsrc files, which maintain lists of articles:

alt.foo: 1-21,28,31
alt.bar: 1-14192,14194,14196-14221

A run of consecutive integers is sometimes called a span.

Sets are stored internally in a run-length coded form. This provides for both compact storage and efficient computation. In particular, set operations can be performed directly on the encoded representation.

Set::IntSpan is designed to manage finite sets. However, it can also represent some simple infinite sets, such as { x | x>n }. This allows operations involving complements to be carried out consistently, without having to worry about the actual value of INT_MAX on your machine.

SPANS

A span is a run of consecutive integers. A span may be represented by an array reference, in any of 5 forms:

Finite forms

  Span                Set
[ $n,    $n    ]      { n }
[ $a,    $b    ]      { x | a<=x && x<=b}

Infinite forms

  Span                Set
[ undef, $b    ]      { x | x<=b }
[ $a   , undef ]      { x | x>=a }
[ undef, undef ]      The set of all integers

Some methods operate directly on spans.

SET SPECIFICATIONS

Many of the methods take a set specification. There are four kinds of set specifications.

Empty

If a set specification is omitted, then the empty set is assumed. Thus,

$set = new Set::IntSpan;

creates a new, empty set. Similarly,

copy $set;

removes all elements from $set.

Object reference

If an object reference is given, it is taken to be a Set::IntSpan object.

Run list

If a string is given, it is taken to be a run list. A run list specifies a set using a syntax similar to that in newsrc files.

A run list is a comma-separated list of runs. Each run specifies a set of consecutive integers. The set is the union of all the runs.

Runs may be written in any of 5 forms.

Finite forms

n

{ n }

a-b

{ x | a<=x && x<=b }

Infinite forms

(-n

{ x | x<=n }

n-)

{ x | x>=n }

(-)

The set of all integers

Empty forms

The empty set is consistently written as '' (the null string). It is also denoted by the special form '-' (a single dash).

Restrictions

The runs in a run list must be disjoint, and must be listed in increasing order.

Valid characters in a run list are 0-9, '(', ')', '-' and ','. White space and underscore (_) are ignored. Other characters are not allowed.

Examples

Run list          Set
"-"               { }
"1"               { 1 }
"1-2"             { 1, 2 }
"-5--1"           { -5, -4, -3, -2, -1 }
"(-)"             the integers
"(--1"            the negative integers
"1-3, 4, 18-21"   { 1, 2, 3, 4, 18, 19, 20, 21 }

Array reference

If an array reference is given, then the elements of the array specify the elements of the set. The array may contain

The set is the union of all the integers and spans in the array. The integers and spans need not be disjoint. The integers and spans may be in any order.

Examples

Array ref            		    Set
[ ]                		    { }
[ 1, 1 ]                          { 1 }
[ 1, 3, 2 ]        		    { 1, 2, 3 }
[ 1, [ 5, 8 ], 5, [ 7, 9 ], 2 ]   { 1, 2, 5, 6, 7, 8, 9 }
[ undef, undef ]                  the integers
[ undef, -1 ]                     the negative integers

ITERATORS

Each set has a single iterator, which is shared by all calls to first, last, start, next, prev, and current. At all times, the iterator is either an element of the set, or undef.

first, last, and start set the iterator; next, and prev move it; and current returns it. Calls to these methods may be freely intermixed.

Using next and prev, a single loop can move both forwards and backwards through a set. Using start, a loop can iterate over portions of an infinite set.

METHODS

Creation

$set = new Set::IntSpan $set_spec
$set = new Set::IntSpan @set_specs

Creates and returns a Set::IntSpan object.

The initial contents of the set are given by $set_spec, or by the union of all the @set_specs.

$ok = valid Set::IntSpan $run_list

Returns true if $run_list is a valid run list. Otherwise, returns false and leaves an error message in $@.

$set = copy $set $set_spec

Copies $set_spec into $set. The previous contents of $set are lost. For convenience, copy returns $set.

$run_list = run_list $set

Returns a run list that represents $set. The run list will not contain white space. $set is not affected.

By default, the empty set is formatted as '-'; a different string may be specified in $Set::IntSpan::Empty_String.

@elements = elements $set

Returns an array containing the elements of $set. The elements will be sorted in numerical order. In scalar context, returns an array reference. $set is not affected.

@sets = sets $set

Returns the runs in $set, as a list of Set::IntSpan objects. The sets in the list are in order.

@spans = spans $set

Returns the runs in $set, as a list of the form

([$a1, $b1],
 [$a2, $b2],
 ...
 [$aN, $bN])

If a run contains only a single integer, then the upper and lower bounds of the corresponding span will be equal.

If the set has no lower bound, then $a1 will be undef. Similarly, if the set has no upper bound, then $bN will be undef.

The runs in the list are in order.

Set operations

For these operations, a new Set::IntSpan object is created and returned. The operands are not affected.

$u_set = union $set $set_spec

Returns the set of integers in either $set or $set_spec.

$i_set = intersect $set $set_spec

Returns the set of integers in both $set and $set_spec.

$x_set = xor $set $set_spec

Returns the set of integers in $set or $set_spec, but not both.

$d_set = diff $set $set_spec

Returns the set of integers in $set but not in $set_spec.

$c_set = complement $set

Returns the set of integers that are not in $set.

Mutators

By popular demand, Set::IntSpan now has mutating forms of the binary set operations. These methods alter the object on which they are called.

$set->U($set_spec)

Makes $set the union of $set and $set_spec. Returns $set.

$set->I($set_spec)

Makes $set the intersection of $set and $set_spec. Returns $set.

$set->X($set_spec)

Makes $set the symmetric difference of $set and $set_spec. Returns $set.

$set->D($set_spec)

Makes $set the difference of $set and $set_spec. Returns $set.

$set->C

Converts $set to its own complement. Returns $set.

Comparison

equal $set $set_spec

Returns true iff $set and $set_spec contain the same elements.

equivalent $set $set_spec

Returns true iff $set and $set_spec contain the same number of elements. All infinite sets are equivalent.

superset $set $set_spec

Returns true iff $set is a superset of $set_spec.

subset $set $set_spec

Returns true iff $set is a subset of $set_spec.

Cardinality

$n = cardinality $set
$n = size $set

Returns the number of elements in $set. Returns -1 for infinite sets. size is provided as an alias for cardinality.

empty $set

Returns true iff $set is empty.

finite $set

Returns true iff $set is finite.

neg_inf $set

Returns true iff $set contains {x | x<n} for some n.

pos_inf $set

Returns true iff $set contains {x | x>n} for some n.

infinite $set

Returns true iff $set is infinite.

universal $set

Returns true iff $set contains all integers.

Membership

member $set $n

Returns true iff the integer $n is a member of $set.

insert $set $n

Inserts the integer $n into $set. Does nothing if $n is already a member of $set.

remove $set $n

Removes the integer $n from $set. Does nothing if $n is not a member of $set.

Extrema

min $set

Returns the smallest element of $set, or undef if there is none.

max $set

Returns the largest element of $set, or undef if there is none.

Spans

$holes = holes $set

Returns a set containing all the holes in $set, that is, all the integers that are in-between spans of $set.

holes is always a finite set.

$cover = cover $set

Returns a set consisting of a single span from $set->min to $set->max. This is the same as

union $set $set->holes
$inset = inset $set $n
$smaller = trim $set $n
$bigger = pad $set $n

inset returns a set constructed by removing $n integers from each end of each span of $set. If $n is negative, then -$n integers are added to each end of each span.

In the first case, spans may vanish from the set; in the second case, holes may vanish.

trim is provided as a synonym for inset.

pad $set $n is the same as inset $set -$n.

Iterators

$set->first

Sets the iterator for $set to the smallest element of $set. If there is no smallest element, sets the iterator to undef. Returns the iterator.

$set->last

Sets the iterator for $set to the largest element of $set. If there is no largest element, sets the iterator to undef. Returns the iterator.

$set->start($n)

Sets the iterator for $set to $n. If $n is not an element of $set, sets the iterator to undef. Returns the iterator.

$set->next

Sets the iterator for $set to the next element of $set. If there is no next element, sets the iterator to undef. Returns the iterator.

next will return undef only once; the next call to next will reset the iterator to the smallest element of $set.

$set->prev

Sets the iterator for $set to the previous element of $set. If there is no previous element, sets the iterator to undef. Returns the iterator.

prev will return undef only once; the next call to prev will reset the iterator to the largest element of $set.

$set->current

Returns the iterator for $set.

Indexing

The elements of a set are kept in numerical order. These methods index into the set based on this ordering.

$n = $set->at($i)

Returns the $ith element of $set, or undef if there is no $ith element. Negative indices count backwards from the end of the set.

Dies if

  • $i is non-negative and $set is neg_inf

  • $i is negative and $set is pos_inf

$slice = $set->slice($from, $to)

Returns a Set::IntSpan object containing the elements of $set at indices $from..$to. Negative indices count backwards from the end of the set.

Dies if

  • $from is non-negative and $set is neg_inf

  • $from is negative and $set is pos_inf

$i = $set->ord($n)

The inverse of at.

Returns the index $i of the integer $n in $set, or undef if $n if not an element of $set.

Dies if $set is neg_inf.

OPERATOR OVERLOADS

For convenience, some operators are overloaded on Set::IntSpan objects.

set operations

One operand must be a Set::IntSpan object. The other operand may be a Set::IntSpan object or a set specification.

$u_set =  $set + $set_spec;   # union
$i_set =  $set * $set_spec;	# intersect
$x_set =  $set ^ $set_spec;	# xor
$d_set =  $set - $set_spec;	# diff
$c_set = ~$set;               # complement

$set += $set_spec;            # union
$set *= $set_spec;		# intersect
$set ^= $set_spec;		# xor
$set -= $set_spec;		# diff

equality

The string comparison operations are overloaded to compare sets for equality and containment. One operand must be a Set::IntSpan object. The other operand may be a Set::IntSpan object or a set specification.

$set eq $set_spec		# equal
$set ne $set_spec		# not equal
$set le $set_spec		# subset
$set lt $set_spec		# proper subset
$set ge $set_spec		# superset
$set gt $set_spec		# proper superset

equivalence

The numerical comparison operations are overloaded to compare sets by cardinality. One operand must be a Set::IntSpan object. The other operand may be a Set::IntSpan object or an integer.

$set1 ==  $set2
$set1 !=  $set2
$set1 <=  $set2
$set1 <   $set2
$set1 >=  $set2
$set1 >   $set2
$set1 <=> $set2
$set1 cmp $set2

$set1 ==  $n
$set1 !=  $n
$set1 <=  $n
$set1 <   $n
$set1 >=  $n
$set1 >   $n
$set1 <=> $n
$set1 cmp $n

N.B. The cmp operator is overloaded to compare sets by cardinality, not containment. This is done so that

sort @sets

will sort a list of sets by cardinality.

conversion

In boolean context, a $Set::IntSpan object evaluates to true if it is not empty.

A $Set::IntSpan object stringizes to its run list.

FUNCTIONS

$sub_set = grep_set { ... } $set

Evaluates the BLOCK for each integer in $set (locally setting $_ to each integer) and returns a Set::IntSpan object containing those integers for which the BLOCK returns TRUE.

Returns undef if $set is infinite.

$map_set = map_set { ... } $set

Evaluates the BLOCK for each integer in $set (locally setting $_ to each integer) and returns a Set::IntSpan object containing all the integers returned as results of all those evaluations.

Evaluates the BLOCK in list context, so each element of $set may produce zero, one, or more elements in the returned set. The elements may be returned in any order, and need not be disjoint.

Returns undef if $set is infinite.

$sub_set = grep_spans { ... } $set

Evaluates the BLOCK for each span in $set and returns a Set::IntSpan object containing those spans for which the BLOCK returns TRUE.

Within BLOCK, $_ is locally set to an array ref of the form

[ $lower, $upper ]

where $lower and $upper are the bounds of the span. If the span contains only one integer, then $lower and $upper will be equal. If the span is unbounded, then the corresponding element(s) of the array will be undef.

$map_set = map_spans { ... } $set

Evaluates the BLOCK for each span in $set, and returns a Set::IntSpan object consisting of the union of all the spans returned as results of all those evaluations.

Within BLOCK, $_ is locally set to an array ref of the form

[ $lower, $upper ]

as described above for grep_spans. Each evaluation of BLOCK must return a list of spans. Each returned list may contain zero, one, or more spans. Spans may be returned in any order, and need not be disjoint. However, for each bounded span, the constraint

$lower <= $upper

must hold.

CLASS VARIABLES

$Set::IntSpan::Empty_String

$Set::IntSpan::Empty_String contains the string that is returned when run_list is called on the empty set. $Empty_String is initially '-'; alternatively, it may be set to ''. Other values should be avoided, to ensure that run_list always returns a valid run list.

run_list accesses $Empty_String through a reference stored in $set->{empty_string}. Subclasses that wish to override the value of $Empty_String can reassign this reference.

DIAGNOSTICS

Any method (except valid) will die if it is passed an invalid run list.

Set::IntSpan::_copy_run_list: Bad syntax: $runList

(F) $run_list has bad syntax

Set::IntSpan::_copy_run_list: Bad order: $runList

(F) $run_list has overlapping runs or runs that are out of order.

Set::IntSpan::elements: infinite set

(F) An infinite set was passed to elements.

Set::IntSpan::at: negative infinite set

(F) at was called with a non-negative index on a negative infinite set.

Set::IntSpan::at: positive infinite set

(F) at was called with a negative index on a positive infinite set.

Set::IntSpan::slice: negative infinite set

(F) slice was called with $from non-negative on a negative infinite set.

Set::IntSpan::slice: positive infinite set

(F) slice was called with $from negative on a positive infinite set.

Set::IntSpan::ord: negative infinite set

(F) ord was called on a negative infinite set.

Out of memory!

(X) elements $set can generate an "Out of memory!" message on sufficiently large finite sets.

NOTES

Traps

Beware of forms like

union $set [1..5];

This passes an element of @set to union, which is probably not what you want. To force interpretation of $set and [1..5] as separate arguments, use forms like

union $set +[1..5];

or

$set->union([1..5]);

grep_set and map_set

grep_set and map_set make it easy to construct sets for which the internal representation used by Set::IntSpan is not small. Consider:

$billion = new Set::IntSpan '0-1_000_000_000';   # OK
$odd     = grep_set { $_ & 1 } $billion;         # trouble
$even    = map_set  { $_ * 2 } $billion;         # double trouble

Error handling

There are two common approaches to error handling: exceptions and return codes. There seems to be some religion on the topic, so Set::IntSpan provides support for both.

To catch exceptions, protect method calls with an eval:

$run_list = <STDIN>;
eval { $set = new Set::IntSpan $run_list };
$@ and print "$@: try again\n";

To check return codes, use an appropriate method call to validate arguments:

$run_list = <STDIN>;
if (valid Set::IntSpan $run_list)
   { $set = new Set::IntSpan $run_list }
else
   { print "$@ try again\n" }

Similarly, use finite to protect calls to elements:

finite $set and @elements = elements $set;

Calling elements on a large, finite set can generate an "Out of memory!" message, which cannot (easily) be trapped. Applications that must retain control after an error can use intersect to protect calls to elements:

@elements = elements { intersect $set "-1_000_000 - 1_000_000" };

or check the size of $set first:

finite $set and cardinality $set < 2_000_000 and @elements = elements $set;

Limitations

Although Set::IntSpan can represent some infinite sets, it does not perform infinite-precision arithmetic. Therefore, finite elements are restricted to the range of integers on your machine.

Extensions

Users report that you can construct Set::IntSpan objects on anything that behaves like an integer. For example:

$x   = new Math::BigInt ...;
$set = new Set::Intspan [ [ $x, $x+5 ] ];

I'm not documenting this as supported behavior, because I don't have the resources to test it, but I'll try not to break it. If anyone finds problems with it, let me know.

Roots

The sets implemented here are based on a Macintosh data structure called a region. See Inside Macintosh for more information.

Set::IntSpan was originally written to manage run lists for the News::Newsrc module.

AUTHOR

Steven McDougall <swmcd@world.std.com>

ACKNOWLEDGMENTS

  • Malcolm Cook <mec@stowers-institute.org>

  • David Hawthorne <dsrthorne@hotmail.com>

  • Martin Krzywinski <martink@bcgsc.ca>

  • Marc Lehmann <schmorp@schmorp.de>

COPYRIGHT

Copyright (c) 1996-2010 by Steven McDougall. This module is free software; you can redistribute it and/or modify it under the same terms as Perl itself.