On finitude of the number of isomorphism classes in the category NT

Abstract

The category was defined in Lobos2, it is a category whose objects are commutative nil graded algebras over a field, defined by presentation encoded by triangular matrices. A natural problem related to this category is to reach a complete classification up to isomorphism of its objects. Based in some results coming from Lobos2, we can divide this problem by working with encoding matrices of a fixed size n. In Lobos3 and Lobos4, there are several advances for this search, in particular, in Lobos3 one can see that, for small matrices, the number of isomorphism classes seems to be finite and independent on the ground field. That fact, opened a series of questions related with the number of isomorphism classes and its relation with the ground field. At that point it was no clear, under which conditions of the ground field, this number could be finite. In this article, among other results, we prove that for each n≥4, the number of isomorphism classes is finite if and only if the ground field is finite.

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