A tensor product approach to compute 2-nilpotent multiplier of p-groups
From MaRDI portal
Publication:5083033
DOI10.1142/S1793557122500905zbMath1494.20021OpenAlexW3184468736MaRDI QIDQ5083033
Publication date: 21 June 2022
Published in: Asian-European Journal of Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1142/s1793557122500905
General structure theorems for groups (20E34) Homological methods in group theory (20J05) Extensions, wreath products, and other compositions of groups (20E22) Finite nilpotent groups, (p)-groups (20D15) Projective representations and multipliers (20C25)
Related Items (2)
On the triple tensor products of groups of order p4 ⋮ On the third tensor power of a nilpotent group of class two
Cites Work
- Unnamed Item
- Some computations of non-Abelian tensor products of groups
- The non-Abelian tensor product of finite groups is finite
- The automorphism group of a generalized extraspecial \(p\)-group.
- Van Kampen theorems for diagrams of spaces
- The Baer-invariant of a direct product
- Tensor products of prime-power groups
- On the nilpotent multipliers of a group
- On the third tensor power of a nilpotent group of class two
- On the triple tensor product of prime-power groups
- \(c\)-nilpotent multiplier of finite \(p\)-groups
- A certain exact sequence
- On the relation between upper central quotients and lower central series of a group
- Categorizing finite p-groups by the order of their non-abelian tensor squares
- ON THE 2-NILPOTENT MULTIPLIER OF FINITEp-GROUPS
- Higher Schur-multiplicator of a Finite Abelian Group
- Characterization of Finitep-Groups by Their Non-Abelian Tensor Square
- Representations of groups as quotient groups. II. Minimal central chains of a group
This page was built for publication: A tensor product approach to compute 2-nilpotent multiplier of p-groups
