GKZ discriminant and Multiplicities (2206.14778v1)

Abstract: Let $T=(\mathbb{C}^*)^k$ act on $V=\mathbb{C}^N$ faithfully and preserving the volume form, i.e. $(\mathbb{C}^*)^k \hookrightarrow \text{SL}(V)$. On the B-side, we have toric stacks $Z_W$ labelled by walls $W$ in the GKZ fan, and toric stacks $Z_{/F}$ labelled by faces of a polytope corresponding to minimal semi-orthogonal decomposition (SOD) components. The B-side multiplicity $n^B_{W,F}$ is the number of times ${Coh}(Z_{/F})$ appears in the SOD of $Coh(Z_W)$. On the A-side, we have the GKZ discriminant loci components $\nabla_F \subset (\mathbb{C}^*)^k$, and its tropicalization $\nabla^{trop}_{F} \subset \mathbb{R}^k$. The A-side multiplicity $n^A_{W, F}$ is defined as the multiplicity of the tropical complex $\nabla^{trop}_{F}$ on the wall $W$. We prove that $n^A_{W,F} = n^B_{W,F}$, confirming a conjecture in Kite-Segal \cite{kite-segal} inspired by \cite{aspinwall2017mirror}. Our proof is based on a lemma about the B-side SOD multiplicities, which allows us to reduce to lower dimensions just as in the A-side \cite{GKZ-book}[Ch 11].