Rooted tree modules
Abstract
A rooted tree module (RTM) M:=M(T,F) over a zero-relation algebra := KQ/ over a field K is given by the data of a quiver morphism F:T Q from a rooted tree T (either with a source or a sink) taking paths in T to paths in Q not lying in . When char( K)≠2, we provide a checkable combinatorial characterization of the indecomposability of the RTM M in terms of non-existence of idempotent quiver morphisms :T T satisfying F=F and ≠ 1T. Further, we provide an iterative method to decompose an RTM into indecomposable RTMs as well as a method to recursively construct indecomposable RTMs.
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