Average fixed cost

In mathematics, specifically in group theory, residue-class-wise affine groups are certain permutation groups acting on ${\displaystyle \mathbb{\mathbb{Z}}}$ (the integers), whose elements are bijective residue-class-wise affine mappings.

A mapping ${\displaystyle f:\mathbb{\mathbb{Z}}\to \mathbb{\mathbb{Z}}}$ is called residue-class-wise affine if there is a nonzero integer ${\displaystyle m}$ such that the restrictions of ${\displaystyle f}$ to the residue classes (mod ${\displaystyle m}$) are all affine. This means that for any residue class ${\displaystyle r(m)\in \mathbb{\mathbb{Z}}/m\mathbb{\mathbb{Z}}}$ there are coefficients ${\displaystyle a_{r(m)},b_{r(m)},c_{r(m)}\in \mathbb{\mathbb{Z}}}$ such that the restriction of the mapping ${\displaystyle f}$ to the set ${\displaystyle r(m)=\{r+km|k\in \mathbb{\mathbb{Z}}\}}$ is given by

${\displaystyle f{|}_{r(m)}:r(m)\to \mathbb{\mathbb{Z}},n\mapsto \frac{a_{r(m)}\cdot n+b_{r(m)}}{c_{r(m)}}}$.

Residue-class-wise affine groups are countable, and they are accessible to computational investigations. Many of them act multiply transitively on ${\displaystyle \mathbb{\mathbb{Z}}}$ or on subsets thereof.

A particularly basic type of residue-class-wise affine permutations are the class transpositions: given disjoint residue classes ${\displaystyle r_1(m_1)}$ and ${\displaystyle r_2(m_2)}$, the corresponding class transposition is the permutation of ${\displaystyle \mathbb{\mathbb{Z}}}$ which interchanges ${\displaystyle r_1+k{m}_1}$ and ${\displaystyle r_2+k{m}_2}$ for every ${\displaystyle k\in \mathbb{\mathbb{Z}}}$ and which fixes everything else. Here it is assumed that ${\displaystyle 0\le r_1<m_1}$ and that ${\displaystyle 0\le r_2<m_2}$.

The set of all class transpositions of ${\displaystyle \mathbb{\mathbb{Z}}}$ generates a countable simple group which has the following properties:

• It is not finitely generated.
• Every finite group, every free product of finite groups and every free group of finite rank embeds into it.
• The class of its subgroups is closed under taking direct products, under taking wreath products with finite groups, and under taking restricted wreath products with the infinite cyclic group.
• It has finitely generated subgroups which do not have finite presentations.
• It has finitely generated subgroups with algorithmically unsolvable membership problem.
• It has an uncountable series of simple subgroups which is parametrized by the sets of odd primes.

It is straightforward to generalize the notion of a residue-class-wise affine group to groups acting on suitable rings other than ${\displaystyle \mathbb{\mathbb{Z}}}$, though only little work in this direction has been done so far.

See also the Collatz conjecture, which is an assertion about a surjective, but not injective residue-class-wise affine mapping.

References and external links

• Stefan Kohl. Restklassenweise affine Gruppen. Dissertation, Universität Stuttgart, 2005. Archivserver der Deutschen Nationalbibliothek OPUS-Datenbank(Universität Stuttgart)
• Stefan Kohl. RCWA - Residue-Class-Wise Affine Groups. GAP package. 2005.
• Stefan Kohl. A Simple Group Generated by Involutions Interchanging Residue Classes of the Integers. Math. Z. 264 (2010), no. 4, 927-938. [1]