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Given a free group $F$ on $d$-generators, generators and a normal subgroup $H$ of $F$ whose index is finite of prime power order. Is, is there a systematic way to find the numbernumbers of generators of $H/[H,F]$(alsoand of$H/[H,F]H^p$)?
Geneators of sections of free groups
Given a free group $F$ on $d$-generators, and a normal subgroup $H$ of $F$ whose index is finite of prime power order. Is there a systematic way to find the number of generators of $H/[H,F]$(also$H/[H,F]H^p$)?
Generators of sections of free groups
Given a free group $F$ on $d$ generators and a normal subgroup $H$ of $F$ whose index is finite of prime power order, is there a systematic way to find the numbers of generators of $H/[H,F]$and of$H/[H,F]H^p$?
Given a free group $F$ on $d$-generators, and a normal subgroup $H$ of $F$ whose index is finite of prime power order. Is there a systematic way to find the number of generators of $H/[H,F]$ (also $H/[H,F]H^p$)?
