The First Syzygy of Hibi Rings Associated with Planar distributive lattices

Abstract: Let $\mathcal{L}$ be a finite distributive lattice and $S=K[x_\alpha: \alpha \in \mathcal{L}]$ be a polynomial ring over a field $K$ and $I=\langle x_\alpha x_\beta - x_{\alpha\vee \beta} x_{\alpha\wedge\beta} : \alpha \nsim \beta,\alpha,\beta \in {\mathcal{L}} \rangle$ an ideal of $S$. In this article we describe the first syzygy of the Hibi ring $R[\mathcal{L}]=S/I$, for a planar distributive lattice $\mathcal{L}$. We also derive an exact formula for the first Betti number of a planar distributive lattice. We give a characterization of planar distributive lattices for which the first syzygy is linear.