On Schur p-groups of odd order
Abstract
A finite group G is called a Schur group if any S-ring over G is associated in a natural way with a subgroup of Sym(G) that contains all right translations. We prove that the groups Z3× Z3n, where n≥ 1, are Schur. Modulo previously obtained results, it follows that every noncyclic Schur p-group, where p is an odd prime, is isomorphic to Z3× Z3 × Z3 or Z3× Z3n, n≥ 1 .
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