For the representation-theoretic study of domestic string algebras, Schröer introduced a version of hammocks that are bounded discrete linear orders. He introduced a finite combinatorial gadget called the bridge quiver, which we modified in the prequel of this paper to get a variation called the arch bridge quiver. Here we use it as a tool to provide an algorithm to compute the order type of an arbitrary closed interval in such hammocks. Moreover, we characterize the class of order types of these hammocks as the bounded discrete ones amongst the class of finitely presented linear orders-the smallest class of linear orders containing finite linear orders as well as ω, and that is closed under isomorphisms, order reversal, finite order sums and lexicographic products.
In the computation of some representation-theoretic numerical invariants of domestic string algebras, a finite combinatorial gadget introduced by Schröerthe 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.
We introduce the concept of a prime band in a string algebra Λ and use it to associate to Λ its finite bridge quiver. Then we introduce a new technique of 'recursive systems' for showing that a graph map between finite dimensional string modules lies in its stable radical. Further we study two classes of nondomestic string algebras in terms of some connectedness properties of its bridge quiver. 'Meta-⋃-cyclic' string algebras constitute the first class that is essentially characterized by the statement that each finite string is a substring of a band. Extending this class we have 'meta-torsion-free' string algebras that are characterized by a dichotomy statement for ranks of graph maps between string modules-such maps either have finite rank or are in the stable radical. Their stable ranks can only take values from {ω, ω + 1, ω + 2}.
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