Orbit closed permutation groups, relation groups, and simple groups
DOI10.1007/s10801-022-01214-2zbMath1522.20006OpenAlexW4318047392MaRDI QIDQ6156186
Andrzej P. Kisielewicz, Grech, Mariusz
Publication date: 13 June 2023
Published in: Journal of Algebraic Combinatorics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s10801-022-01214-2
simple groupregular setautomorphism group of a Boolean functionautomorphism group of a hypergraphorbit closed permutation grouprelation group
Finite automorphism groups of algebraic, geometric, or combinatorial structures (20B25) Simple groups (20E32) General theory for finite permutation groups (20B05) Combinatorial aspects of groups and algebras (05E16)
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Finite primitive groups and edge-transitive hypergraphs
- Symmetry groups of Boolean functions.
- Orbit equivalence and permutation groups defined by unordered relations.
- Distinguishing labeling of the actions of almost simple groups.
- On groups with no regular orbits on the set of subsets
- On finite permutation groups with the same orbits on unordered sets
- Symmetry groups of Boolean functions and constructions of permutation groups
- A proof of Pyber's base size conjecture
- Distinguishing numbers for graphs and groups
- Invariance groups of functions and related Galois connections
- Inverse monoids of partial graph automorphisms
- Distinguishing index of graphs with simple automorphism groups
- Invariance groups of finite functions and orbit equivalence of permutation groups.
- Graphical representations of cyclic permutation groups
- The distinguishing number of quasiprimitive and semiprimitive groups
- Orbit-equivalent infinite permutation groups.
- Base size, metric dimension and other invariants of groups and graphs
- Boolean Functions, Invariance Groups, and Parallel Complexity
- Primitive Groups with no Regular Orbits on the Set of Subsets
- Trivial Set-Stabilizers in Finite Permutation Groups
- Set-Transitive Permutation Groups
This page was built for publication: Orbit closed permutation groups, relation groups, and simple groups
