Invariance of Schur multiplier, Bogomolov multiplier and the minimal number of generators under a variant of isoclinism
Abstract
We introduce the q-Bogomolov multiplier as a generalization of the Bogomolov multiplier, and we prove that it is invariant under q-isoclinism. We prove that the q-Schur Multiplier is invariant under q- exterior isoclinism, and as an easy consequence we prove that the Schur multiplier is invariant under exterior isoclinism. We also prove that if G, H are p-groups and G/Z(G) H/Z(H), then the cardinality of the minimal number of generators of G and H are the same. Moreover we prove some structural results about q-nonabelian tensor square of groups.
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