The Weak Lefschetz Property for monomial complete intersections
Abstract
Let , where is an infinite field. If has characteristic zero, then Stanley proved that has the Weak Lefschetz Property (WLP). Henceforth, has positive characteristic . If , then Brenner and Kaid have identified all , as a function of , for which has the WLP. In the present paper, the analogous project is carried out for . If and , then has the WLP if and only if . If and is odd, then we prove that has the WLP if and only if for integers with , , and for some non-negative integer . If , then we prove that has the WLP if and only if . We first interpret the WLP for the ring in terms of the degrees of the non-Koszul relations on the elements in the polynomial ring . We then exhibit a sufficient condition for to have the WLP. This condition is expressed in terms of the non-vanishing in of determinants of various Toeplitz matrices of binomial coefficients. Frobenius techniques are used to produce relations of low degree on , ..., , . From this we obtain a necessary condition for to have the WLP. We prove that the necessary condition is sufficient by showing that the relevant determinants are non-zero in .
Cite
@article{arxiv.1110.2822,
title = {The Weak Lefschetz Property for monomial complete intersections},
author = {Andrew R. Kustin and Adela Vraciu},
journal= {arXiv preprint arXiv:1110.2822},
year = {2011}
}