On Fox quotients of arbitrary group algebras

Abstract

For a group G, N-series G of G and commutative ring R let InR, G(G), n 0, denote the filtration of the group algebra R(G) induced by G, and IR(G) its augmentation ideal. For subgroups H of G, left ideals J of R(H) and right H-submodules M of IZ(G) the quotients IR(G)J/MJ are studied by homological methods, notably for M= IZ(G)IZ(H), IZ(H)IZ(G) + IZ([H,G])Z(G) and Z(G)IZ(N) +InZ, G(G) with N G where the group IR(G)J/MJ is completely determined for n=2. The groups In-1Z, G(G)IZ(H)/InZ, G(G)IZ(H) are studied and explicitly computed for n 3 in terms of enveloping rings of certain graded Lie rings and of torsion products of abelian groups.