Uniqueness theorems for Lp-operator graph algebras
Abstract
We continue the study of Lp-operator algebras associated with directed graphs initiated by Corti\~nas and Rodr\'iguez, and we establish Lp-analogs of both the gauge-invariant and the Cuntz-Krieger uniqueness theorems. The first of these asserts that for a graph Q, a gauge-equivariant spatial representation of its Leavitt path algebra LQ on an Lp-space generates an injective representation whenever the idempotents associated to the vertices of Q are nonzero. The second of these theorems states that, in the setting just described, the same conclusion holds if gauge-equivariance is replaced by the assumption that every cycle in Q has an entry. Additionally, we show that for acyclic graphs, such representations are automatically isometric. While our general approach is inspired by the proofs in the C*-algebra setting, a careful analysis of spatial representations of graphs on Lp-spaces is required. In particular, we exploit the interplay between analytical properties of Banach algebras, such as the role of hermitian elements, and geometric notions specific to Lp-spaces, such as spatial implementation.
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