...one of the most highly
regarded and expertly designed C++ library projects in the
world.
— Herb Sutter and Andrei
Alexandrescu, C++
Coding Standards
Copyright © 2007-2010 Joachim Faulhaber
Copyright © 1999-2006 Cortex Software GmbH
Distributed under the Boost Software License, Version 1.0. (See accompanying file LICENSE_1_0.txt or copy at http://www.boost.org/LICENSE_1_0.txt)
Table of Contents
“A bug crawls across the boost docs on my laptop screen. Let him be! We need all the readers we can get.” -- Freely adapted from Jack Kornfield
Intervals are almost ubiquitous in software development. Yet they are very easily coded into user defined classes by a pair of numbers so they are only implicitly used most of the time. The meaning of an interval is simple. They represent all the elements between their lower and upper bound and thus a set. But unlike sets, intervals usually can not be added to a single new interval. If you want to add intervals to a collection of intervals that does still represent a set, you arrive at the idea of interval_sets provided by this library.
Interval containers of the ICL have been developed initially at Cortex Software GmbH to solve problems related to date and time interval computations in the context of a Hospital Information System. Time intervals with associated values like amount of invoice or set of therapies had to be manipulated in statistics, billing programs and therapy scheduling programs. So the ICL emerged out of those industrial use cases. It extracts generic code that helps to solve common problems from the date and time problem domain and can be beneficial in other fields as well.
One of the most advantageous aspects of interval containers is their very compact representation of sets and maps. Working with sets and maps of elements can be very inefficient, if in a given problem domain, elements are typically occurring in contiguous chunks. Besides a compact representation of associative containers, that can reduce the cost of space and time drastically, the ICL comes with a universal mechanism of aggregation, that allows to combine associated values in meaningful ways when intervals overlap on insertion.
For a condensed introduction and overview you may want to look at the presentation material on the ICL from BoostCon2009.
The Interval Container Library (ICL) provides
intervals
and two kinds
of interval containers: interval_sets
and interval_maps
.
interval_set
is a set that is implemented as a set
of intervals.
interval_map
is a map that is implemented as a map
of interval value pairs.
Interval_sets
and interval_maps
expose two different aspects in their interfaces: (1) The functionality of
a set or a map, which is the more abstract
aspect. And (2) the functionality of a container of
intervals which is the more specific and implementation
related aspect. In practice both aspects are useful
and are therefore supported.
The first aspect, that will be called fundamental
aspect, is the more
important one. It means that we can use an interval_set
or interval_map
like
a set or map of elements.
It exposes the same functions.
interval_set<int> mySet; mySet.insert(42); bool has_answer = contains(mySet, 42);
The second aspect, that will be called segmental
aspect, allows to exploit
the fact, that the elements of interval_sets
and interval_maps
are
clustered in intervals
or segments that we
can iterate over.
// Switch on my favorite telecasts using an interval_set interval<seconds>::type news(make_seconds("20:00:00"), make_seconds("20:15:00")); interval<seconds>::type talk_show(make_seconds("22:45:30"), make_seconds("23:30:50")); interval_set<seconds> myTvProgram; myTvProgram.add(news).add(talk_show); // Iterating over elements (seconds) would be silly ... for(interval_set<seconds>::iterator telecast = myTvProgram.begin(); telecast != myTvProgram.end(); ++telecast) //...so this iterates over intervals TV.switch_on(*telecast);
Working with interval_sets
and interval_maps
can be beneficial whenever the elements of sets appear in contiguous chunks:
intervals
. This is obviously
the case in many problem domains, particularly in fields that deal with computations
related to date and time.
Unlike std::sets
and maps
,
interval_sets
and interval_maps
implement concept Addable
and Subtractable
. So interval_sets
define an
operator +=
that is naturally implemented as set union
and an operator -=
that is consequently implemented as set difference.
In the Icl interval_maps
are addable and subtractable as well. It turned out to be a very fruitful
concept to propagate the addition or subtraction to the interval_map's
associated values in cases where the insertion of an interval value pair
into an interval_map
resulted in a collision of the inserted interval value pair with interval
value pairs, that are already in the interval_map
.
This operation propagation is called aggregate
on overlap.
This is a first motivating example of a very small party, demonstrating the
aggregate on overlap
principle on interval_maps
:
In the example Mary enters the party first. She attends during the time interval
[20:00,22:00)
. Harry enters later. He stays within [21:00,23:00)
.
typedef std::set<string> guests; interval_map<time, guests> party; party += make_pair(interval<time>::right_open(time("20:00"), time("22:00")), guests("Mary")); party += make_pair(interval<time>::right_open(time("21:00"), time("23:00")), guests("Harry")); // party now contains [20:00, 21:00)->{"Mary"} [21:00, 22:00)->{"Harry","Mary"} //guest sets aggregated on overlap [22:00, 23:00)->{"Harry"}
On overlap of intervals,
the corresponding name sets are accumulated.
At the points of overlap
the intervals are split.
The accumulation of content on overlap of intervals is done via an operator +=
that has to be implemented for the associated values of the interval_map
.
In the example the associated values are guest
sets
. Thus a guest
set
has to implement operator +=
as set union.
As can be seen from the example an interval_map
has both a decompositional behavior
(on the time dimension) as well as an accumulative
one (on the associated values).
Addability and aggregate on overlap are useful features on interval_maps
implemented via function add
and operator +=
.
But you can also use them with the traditional insert semantics
that behaves like std::map::insert
generalized for interval insertion.
In addition to interval containers we can work with containers of elements
that are behavioral equal
to the interval containers: On the fundamental aspect they have exactly the
same functionality. An std::set
of the STL is such an equivalent set implementation. Due to the
aggregation facilities of the icl's interval maps std::map
is fundamentally not completely equivalent to an interval_map
.
Therefore there is an extra icl::map
class template for maps of elements in the icl.
std::set
is behavioral equal to
interval_sets
on the fundamental
aspect.
icl::map
is behavioral
equal to interval_maps
on the fundamental
aspect. Specifically an icl::map
implements aggregate on overlap,
which is named aggregate on collision
for an element container.
The following tables give an overview over the main class templates provided by the icl.
Table 1.1. Interval class templates
group |
form |
template |
---|---|---|
statically bounded |
asymmetric |
|
symmetric |
||
dynamically bounded |
||
Statically bounded intervals always have the same kind of interval borders,
e.g. right open borders[a..b)
for right_open_interval
.
Dynamically bounded intervals can have different borders. Refer to the chapter
about intervals for details.
Table 1.2. Container class templates
granularity |
style |
sets |
maps |
---|---|---|---|
interval |
joining |
||
separating |
|||
splitting |
|||
element |
( |
Std::set
is placed in paretheses, because it is not a class template of the
ICL. It can be used as element container
though that is behavioral equal to the ICL's interval sets on their fundamental
aspect. Column style
refers to the different ways in which interval containers combine added intervals.
These combining styles
are described in the next section.
When we add intervals or interval value pairs to interval containers, the intervals can be added in different ways: Intervals can be joined or split or kept separate. The different interval combining styles are shown by example in the tables below.
Table 1.3. Interval container's ways to combine intervals
joining |
separating |
splitting |
|
---|---|---|---|
set |
|||
map |
|||
Intervals are joined on overlap or touch |
Intervals are joined on overlap, not on touch. |
Intervals are split on overlap. |
Table 1.4. Interval combining styles by example
joining |
separating |
splitting |
|
---|---|---|---|
set |
|||
{[1 3) } + [2 4) + [4 5) = {[1 5)}
|
{[1 3)} } + [2 4) + [4 5) = {[1 4)[4 5)}
|
{[1 3) } + [2 4) + [4 5) = {[1 2)[2 3)[3 4)[4 5)}
|
|
map |
|||
{[1 3)->1 } + [2 4)->1 + [4 5)->1 = {[1 2)[2 3)[3 5) } | ->1 ->2 ->1 |
|
{[1 3)->1 } + [2 4)->1 + [4 5)->1 = {[1 2)[2 3)[3 4)[4 5) } | ->1 ->2 ->1 ->1 |
|
Note that interval_sets
A, B
and C represent the same set of elements {1,2,3,4}
and interval_maps
D and E
represent the same map of elements {1->1, 2->2, 3->1, 4->1}
.
See example program Interval
container for an additional demo.
Interval_set
and interval_map
are always in a
minimal representation.
This is useful in many cases, where the points of insertion or intersection
of intervals are not relevant. So in most instances interval_set
and interval_map
will
be the first choice for an interval container.
Split_interval_set
and split_interval_map
on the contrary have an insertion memory.
They do accumulate interval borders both from additions and intersections.
This is specifically useful, if we want to enrich an interval container with
certain time grids, like e.g. months or calendar weeks or both. See example
time grids for months and weeks.
Separate_interval_set
implements the separating style. This style preserves borders, that are never
passed by an overlapping interval. So if all intervals that are inserted
into a separate_interval_set
are generated form a certain grid that never pass say month borders, then
these borders are preserved in the separate_interval_set
.
14:46 15.10.2010
Last revised: April 06, 2022 at 21:07:11 GMT |