Modules over linear spaces admitting a multiplicative basis

Abstract

We study the structure of certain modules V over linear spaces W with restrictions neither on the dimensions nor on the base field F. A basis B = \vi\i∈ I of V is called multiplicative respect to the basis B' = \wj\j ∈ J of W if for any i ∈ I, j ∈ J we have either viwj = 0 or 0 ≠ viwj ∈ Fvk for some k ∈ I. We show that if V admits a multiplicative basis then it decomposes as the direct sum V=k Vk of well-described submodules admitting each one a multiplicative basis. Also the minimality of V is characterized in terms of the multiplicative basis and it is shown that the above direct sum is by means of the family of its minimal submodules, admitting each one a multiplicative basis.