Quasi-hereditary covers of Temperley-Lieb algebras and relative dominant dimension

Abstract

Many connections and dualities in representation theory can be explained using quasi-hereditary covers in the sense of Rouquier. The concepts of relative dominant and codominant dimension with respect to a module, introduced recently by the first-named author, are important tools to evaluate and classify quasi-hereditary covers. In this paper, we prove that the relative dominant dimension of the regular module of a quasi-hereditary algebra with a simple preserving duality with respect to a summand Q of a characteristic tilting module equals twice the relative dominant dimension of a characteristic tilting module with respect to Q. To resolve the Temperley-Lieb algebras of infinite global dimension, we apply this result to the class of Schur algebras S(2, d) and Q=V d the d-tensor power of the 2-dimensional module and we completely determine the relative dominant dimension of the Schur algebra S(2, d) with respect to V d. The q-analogues of these results are also obtained. As a byproduct, we obtain a Hemmer-Nakano type result connecting the Ringel duals of q-Schur algebras and Temperley-Lieb algebras. From the point of view of Temperley-Lieb algebras, we obtain the first complete classification of their connection to their quasi-hereditary covers formed by Ringel duals of q-Schur algebras. These results are compatible with the integral setup, and we use them to deduce that the Ringel dual of a q-Schur algebra over the ring of Laurent polynomials over the integers together with some projective module is the best quasi-hereditary cover of the integral Temperley-Lieb algebra.

0

Turn this paper into a full lesson

ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.

Discussion (0)

Sign in to join the discussion.

Loading comments…