Inflations for representations of shifted quantum affine algebras (2404.02253v2)

Abstract: Fix a finite-dimensional simple Lie algebra $\mathfrak{g}$ and let $\mathfrak{g}J\subseteq\mathfrak{g}$ be a Lie subalgebra coming from a Dynkin diagram inclusion. Then, the corresponding restriction functor is not essentially surjective on finite-dimensional simple $\mathfrak{g}_J$-modules. In this article, we study Finkelberg-Tsymbaliuk's shifted quantum affine algebras $U_q^{\mu}(\mathfrak{g})$ and the associated categories $\mathcal{O}^{\mu}$ (defined by Hernandez). In particular, we introduce natural subalgebras $U_q^{\nu}(\mathfrak{g}_J)\,{\subseteq}\,U_q^{\mu}(\mathfrak{g})$ and obtain a functor $\mathcal{R}_J$ from $\mathcal{O}^{sh}\,{=}\bigoplus{\mu}\mathcal{O}^{\mu}$ to $\bigoplus_{\nu}(U_q^{\nu}(\mathfrak{g}_J)\text{-Mod})$ using the canonical restriction functors. We then establish that $\mathcal{R}_J$ is essentially surjective on finite-dimensional simple objects by constructing notable preimages that we call inflations. We conjecture that all simple objects in $\mathcal{O}^{sh}_J$ (which is the analog of $\mathcal{O}^{sh}$ for the subalgebras $U_q^{\nu}(\mathfrak{g}_J)$) admit some inflation and prove this for $\mathfrak{g}$ of type A-B or $\mathfrak{g}_J$ a direct sum of copies of $\mathfrak{sl}_2$ and $\mathfrak{sl}_3$. We finally apply our results to deduce certain $R$-matrices and examples of cluster structures over Grothendieck rings.