Symmetry, Unimodality, and Lefschetz Properties for Graded Modules

If $\mbk$ is algebraically closed of characteristic zero and $R = \mbk[x,y, z]$, we first investigate the Weak Lefschetz Property for the finite length $R$-module $M$ that is the cokernel of a map $\vp: \bds_{j=1}^{n+2} R(-b_j)\to\bds_{i=1}^n R(-a_i)$. Before doing so, we spend significant time discuss the minimal free resolution of $M$, which we use to prove useful results on the symmetry and unimodality of the Hilbert function of $M$. Lastly, we define the\textit{non-Lefschetz locus} for finite length graded modules in arbitrary codimension, as well as proving several results in this direction. Moreover, we also discuss the connection with Artin level modules, the non-Lefschetz locus, and Lefschetz properties for graded modules of finite length in arbitrary codimension.