Symbolic computation of Schur multipliers with an application to the groups of order dividing p6
Abstract
We describe an algorithm to compute the Schur multipliers of all nilpotent Lie p-rings in the family defined by a symbolic nilpotent Lie p-ring. Symbolic nilpotent Lie p-rings can be used to describe the isomorphism types of p-groups of order pn for n ≤ 7 and all primes p ≥ n. We apply our algorithm to compute the Schur multipliers of all p-groups of order dividing p6.
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