Dear GAP forum, I have the following question concerning the GAP package qpa.
Let k be a fixed finite field and let Q be a fixed quiver. Let kQ denote the associated path algebra. Since k is finite, there are only finitely many admissible ideals I of kQ with the property I^u=0 for some fixed natural number u. I would like to know, if there is a way to tell qpa to find all such ideals, and, if so, how to do this. With other words, my input is: [k,Q,u] and the output should be a list containing all quiver algebras kQ/I as entries. Thanks for the help! _______________________________________________ Forum mailing list Forum@mail.gap-system.org http://mail.gap-system.org/mailman/listinfo/forum
