Some infinitely generated non projective modules over path algebras and their extensions under Martin's Axiom

Abstract

In this paper it is proved that, when Q is a quiver that admits some closure, for any algebraically closed field K and any finite dimensional K-linear representation X of Q, if Ext1KQ(X,KQ)=0 then X is projective (Theorem 1.10). In contrast, we show that if Q is a specific quiver of the type above, then there is an infinitely generated non-projective KQ-module Mω1 such that, when K is a countable field, MA_1 (Martin's Axiom for 1 many dense sets, which is a combinatorial axiom in set theory) implies that Ext1KQ(Mω1,KQ)=0 (Theorem 2.11).