Inflations for representations of shifted quantum affine algebras

Abstract

Fix a finite-dimensional simple Lie algebra g and let gJ⊂eqg be a Lie subalgebra coming from a Dynkin diagram inclusion. Then, the corresponding restriction functor is not essentially surjective on finite-dimensional simple gJ-modules. In this article, we study Finkelberg-Tsymbaliuk's shifted quantum affine algebras Uqμ(g) and the associated categories Oμ (defined by Hernandez). In particular, we introduce natural subalgebras Uq(gJ)\,⊂eq\,Uqμ(g) and obtain a functor RJ from Osh\,=μOμ to (Uq(gJ)-Mod) using the canonical restriction functors. We then establish that RJ is essentially surjective on finite-dimensional simple objects by constructing notable preimages that we call inflations. We conjecture that all simple objects in OshJ (which is the analog of Osh for the subalgebras Uq(gJ)) admit some inflation and prove this for g of type A-B or gJ a direct sum of copies of sl2 and sl3. We finally apply our results to deduce certain R-matrices and examples of cluster structures over Grothendieck rings.

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