On the first τ-tilting Hochschild cohomology of an algebra
Abstract
In this paper we introduce, according to one of the main ideas of τ-tilting theory, the τ-Hochschild cohomology in degree one of a finite dimensional k-algebra , where k is a field. We define the excess of as the difference between the dimensions of the τ-Hochschild cohomology in degree one and the dimension of the usual Hochschild cohomology in degree one. One of the main results is that for a zero excess bound quiver algebra =kQ/I, the Hochschild cohomology in degree two HH2() is isomorphic to the space of morphisms HomkQ-kQ(I/I2, ). This is useful to determine when HH2()=0 for these algebras. We compute the excess for hereditary, radical square zero and monomial triangular algebras. For a bound quiver algebra , a formula for the excess of is obtained. We also give a criterion for to be τ-rigid.
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