Linear maps on kI, and homomorphic images of infinite direct product algebras

Abstract

Let k be an infinite field, I an infinite set, V a k-vector-space, and g:kI V a k-linear map. It is shown that if dimk(V) is not too large (under various hypotheses on card(k) and card(I), if it is finite, respectively countable, respectively < card(k)), then ker(g) must contain elements (ui)i∈ I with all but finitely many components ui nonzero. These results are used to prove that any homomorphism from a direct product ΠI Ai of not-necessarily-associative algebras Ai onto an algebra B, where dimk(B) is not too large (in the same senses) must factor through the projection of ΠI Ai onto the product of finitely many of the Ai, modulo a map into the subalgebra \b∈ B | bB=Bb=\0\\⊂eq B. Detailed consequences are noted in the case where the Ai are Lie algebras.