All Questions
12 questions
4
votes
0
answers
88
views
Diameters of permutation groups with transitive generators
Suppose that for a permutation puzzle on $n$ elements we have a subroutine to place any $m>3$ elements in arbitrary positions (possibly scrambling the rest). Can we solve the puzzle (if it is ...
- 7,545
2
votes
1
answer
114
views
If $n=2m$, what is the order of the permutation $\sigma(k)=2k , \quad \sigma(m+k)=2k-1$
Let $n=2m$. What is the order of the following permutation $\sigma$?
$$1\leq k\leq m \Rightarrow \sigma(k)=2k , \quad \sigma(m+k)=2k-1$$
- 3,808
0
votes
1
answer
213
views
A particular permutation on $\mathbb{Z}_n$
Let us consider $\mathbb{Z}_N=\{0,1,\cdots N-1\}$.
Does there exist any permutation $\sigma$ on $\mathbb{Z}_N$ satisfying :
$$\exists p,q\in\mathbb{N}, ~~p,q\neq0 (mod~N) ~~\forall i,j\in \mathbb{Z}...
- 30.1k
5
votes
3
answers
498
views
Generation of permutation groups by fixed elements subgroups
Suppose $(H,X)$ is a permutation group (with $H$ a group acting faithfully on the set $X$). Under what circumstances is $H$ generated by its subgroups $H_x$, where $H_x$ is the subgroup of $H$ fixing $...
- 2,821
7
votes
1
answer
344
views
For which $n$ can $S_n$ act transitively on $n+k$ elements?
It is known that the symmetric group $S_n$ can act transitively on $n+1$ elements if and only if $n=5$.
Are there similar classifications for $S_n$ acting transitively on $n+k$ elements, where $k$ is ...
- 2,217
11
votes
1
answer
248
views
How many steps are required for double transitivity?
Let $A$ be a set of generators of $S_n$, or of a doubly transitive
subgroup of $S_n$. Assume $e\in A$, $A=A^{-1}$. What is the least $k$
such that $A^k$ is doubly transitive as a set? That is, what is ...
- 23.7k
4
votes
1
answer
152
views
Diameter for permutations of bounded support
Let $S\subset \textrm{Sym}(n)$ be a set of permutations each of which is of bounded support, that is, each $\sigma\in S$ moves $O(1)$ elements of $\{1,2,\dotsc,n\}$. Let $\Gamma$ be the graph whose ...
- 20.2k
3
votes
1
answer
506
views
A permutation with reflection property
Consider permutations $\pi$ of the set $\{1,\dots,n\}$ having the symmetry property $\pi \pi^* \pi = \pi^*$, where $\pi^*$ is the "reflection" $k \mapsto n+1-k$. Are there references or other ...
- 12.9k
3
votes
2
answers
338
views
Length of composition series in a primitive group
Let $G$ be a primitive group acting on a set $\Omega$ with $n$ elements. By Cameron/Liebeck (essentially a consequence of the Classification + O'Nan-Scott), there are two possibilities:
(a) $G$ has a ...
- 20.2k
1
vote
0
answers
54
views
Set of vectors closed under restricted permutation operations
Let $V=\{v_1,\cdots v_k\}$ a set of non zero different norm one vectors in $R^d$, $k>2$. I am trying to demonstrate that if $Q=\{P_i\in R^{k\times k},i=1,\cdots,k\}$ is a set of permutations such ...
- 329
6
votes
1
answer
462
views
Primitive, non-2-transitive groups with very large orbitals?
Let $G$ be a transitive permutation group on a set $X$ with $n$ elements. Assume that $G$ is primitive, i.e., $G$ preserves no non-trivial partition of $X$. Assume as well that $G$ is not $2$-...
- 3,571
6
votes
2
answers
623
views
Two groups acting on a set.
Suppose we are given a set S of points on which two different groups G and G' (given by sets of generating permutations) act. Is there an efficient algorithm for finding generators the largest pair ...
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