Hadamard Products and Binomial Ideals

TL;DR

This paper investigates the Hadamard product of binomial varieties, providing explicit formulas for their defining equations when binomials share exponents, and explores algebraic invariants and applications to graph toric ideals.

Contribution

It offers explicit computation methods for Hadamard products of binomial varieties with shared exponents and links these to graph toric ideals and algebraic invariants.

Findings

Explicit formulas for Hadamard products of binomial varieties with same exponents.

Degree and dimension invariance under Hadamard product for binomial varieties.

Connection between Hadamard products and toric ideals of graphs.

Abstract

We study the Hadamard product of two varieties $V$ and $W$, with particular attention to the situation when one or both of $V$ and $W$ is a binomial variety. The main result of this paper shows that when $V$ and $W$ are both binomial varieties, and the binomials that define $V$ and $W$ have the same binomial exponents, then the defining equations of $V \star W$ can be computed explicitly and directly from the defining equations of $V$ and $W$. This result recovers known results about Hadamard products of binomial hypersurfaces and toric varieties. Moreover, as an application of our main result, we describe a relationship between the Hadamard product of the toric ideal $I_G$ of a graph $G$ and the toric ideal $I_H$ of a subgraph $H$ of $G$. We also derive results about algebraic invariants of Hadamard products: assuming $V$ and $W$ are binomial with the same exponents, we show that $\text{deg}(V\star W) = \text{deg}(V)=\text{deg}(W)$ and $\dim(V\star W) = \dim(V)=\dim(W)$. Finally, given any (not necessarily binomial) projective variety $V$ and a point $p \in \mathbb{P}^n \setminus \mathbb{V}(x_0x_1\cdots x_n)$, subject to some additional minor hypotheses, we find an explicit binomial variety that describes all the points $q$ that satisfy $p \star V = q\star V$.