Graded isomorphisms of Leavitt path algebras and Leavitt inverse semigroups

Abstract: Leavitt inverse semigroups of directed finite graphs are related to Leavitt graph algebras of (directed) graphs. Leavitt path algebras of graphs have the natural $\mathbb Z$-grading via the length of paths in graphs. We consider the $\mathbb Z$-grading on Leavitt inverse semigroups. For connected finite graphs having vertices out-degree at most $1$, we give a combinatorial sufficient and necessary condition on graphs to classify the corresponding Leavitt path algebras and Leavitt inverse semigroups up to graded isomorphisms. More precisely, the combinatorial condition on two graphs coincides if and only if the Leavitt path algebras of the two graphs are $\mathbb Z$-graded isomorphic if and only if the Leavitt inverse semigroups of the two graphs are $\mathbb Z$-graded isomorphic.