Frobenius--Perron dimension via τ-tilting theory
Abstract
From the perspective of τ-tilting theory, we study Frobenius--Perron dimensions of finite-dimensional algebras. First, we evaluate the Frobenius--Perron dimensions of τ-tilting finite algebras by a combinatorial method in τ-tilting theory. Secondly, we give the upper bound for the Frobenius--Perron dimension for τ-tilting finite algebras of tame representation type. Thirdly, we determine the Frobenius--Perron dimensions of Nakayama algebras and generalized preprojective algebras of Dynkin type in the sense of Geiss--Leclerc--Schr\"oer.
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