The Direct Factor Problem for Modular Group Algebras of Isolated Direct Sums of Torsion-Complete Abelian Groups |
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| Authors: | Peter Danchev |
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| Institution: | (1) Present address: Mathematical Department, Plovdiv State University, 4000 Plovdiv, Bulgaria Insurance Supervision Directorate, Ministry of Finance, 1000 Sofia, Bulgaria;(2) 13, General Kutuzov Street, block 7, floor 2, flat 4, 4003, Plovdiv, Bulgaria |
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| Abstract: | Let R be an arbitrary commutative unitary ring of prime characteristic p and G an arbitrary abelian group whose p-component Gp is an isolated direct sum of torsion-complete abelian groups. Then Gp is a direct factor of S(RG). As a consequence, the same holds when G is a direct sum of groups for which their p-components are torsion-complete groups. In particular when G is p-mixed, it is a direct factor of V(RG) provided R is a field. The formulated results extend a classical theorem of May (Contemp. Math., 1989) for direct sums of cyclic groups and its generalization due to the author (Proc. Amer. Math. Soc., 1997).AMS Subject Classification (2000): Primary 16 U60, 16 S34; Secondary 20 K10, 20 K20, 20 K21. |
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| Keywords: | direct factors isolated direct sums torsion-complete groups |
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