Schreier vector
Encyclopedia
In mathematics
, especially the field of computational group theory
, a Schreier vector is a tool for reducing the time and space complexity required to calculate orbits of a permutation group
.
with generating sequence which acts
on the finite set . A common task in computational group theory is to compute the orbit of some element under G. At the same time, one can record a Schreier vector for . This vector can then be used to find an element satisfying , for any . Use of Schreier vectors to perform this requires less storage space and time complexity than storing these g explicitly.
A Schreier vector for is a vector such that:
, the use of Schreier vectors in two algorithms
Mathematics
Mathematics is the study of quantity, space, structure, and change. Mathematicians seek out patterns and formulate new conjectures. Mathematicians resolve the truth or falsity of conjectures by mathematical proofs, which are arguments sufficient to convince other mathematicians of their validity...
, especially the field of computational group theory
Computational group theory
In mathematics, computational group theory is the study ofgroups by means of computers. It is concernedwith designing and analysing algorithms anddata structures to compute information about groups...
, a Schreier vector is a tool for reducing the time and space complexity required to calculate orbits of a permutation group
Permutation group
In mathematics, a permutation group is a group G whose elements are permutations of a given set M, and whose group operation is the composition of permutations in G ; the relationship is often written as...
.
Overview
Suppose G is a finite groupGroup (mathematics)
In mathematics, a group is an algebraic structure consisting of a set together with an operation that combines any two of its elements to form a third element. To qualify as a group, the set and the operation must satisfy a few conditions called group axioms, namely closure, associativity, identity...
with generating sequence which acts
Group action
In algebra and geometry, a group action is a way of describing symmetries of objects using groups. The essential elements of the object are described by a set, and the symmetries of the object are described by the symmetry group of this set, which consists of bijective transformations of the set...
on the finite set . A common task in computational group theory is to compute the orbit of some element under G. At the same time, one can record a Schreier vector for . This vector can then be used to find an element satisfying , for any . Use of Schreier vectors to perform this requires less storage space and time complexity than storing these g explicitly.
Formal definition
All variables used here are defined in the overview.A Schreier vector for is a vector such that:
- For (the manner in which the are chosen will be made clear in the next section)
- for
Use in algorithms
Here we illustrate, using pseudocodePseudocode
In computer science and numerical computation, pseudocode is a compact and informal high-level description of the operating principle of a computer program or other algorithm. It uses the structural conventions of a programming language, but is intended for human reading rather than machine reading...
, the use of Schreier vectors in two algorithms
- Algorithm to compute the orbit of ω under G and the corresponding Schreier vector
- Input: ω in Ω,
- for i in { 0, 1, …, n }:
- set v[i] = 0
- set orbit = { ω }, v[ω] = −1
- for α in orbit and i in { 1, 2, …, r }:
- if is not in orbit:
- append to orbit
- set
- if is not in orbit:
- return orbit, v
- Algorithm to find a g in G such that ωg = α for some α in Ω, using the v from the first algorithm
- Input: v, α, X
- if v[α] = 0:
- return false
- set g = e, and k = v[α] (where e is the identity element of G)
- while k ≠ −1:
- set
- return g