Variations of the bridge quiver for domestic string algebras

Abstract

In the computation of some representation-theoretic numerical invariants of domestic string algebras, a finite combinatorial gadget introduced by Schr\"oer--the bridge quiver whose vertices are (representatives of cyclic permutations of) bands and whose arrows are certain band-free strings--has been used extensively. There is a natural but ill-behaved partial binary operation, , on the larger set of weak bridges such that bridges are precisely the -irreducibles. With the goal of computing hammocks up to isomorphism in a later work we equip an even larger set of weak arch bridges with another partial binary operation, H, to obtain a finite category. Each weak arch bridge admits a unique H-factorization into arch bridges, i.e., the H-irreducibles.