Asymptotic properties of differential operators around a singularity
Abstract: For a local algebra $R$ over a field, we study the decomposition of the module of principal parts. A free summand of the $n$-th module of principal parts is essentially the same as a differential operator $E$ of order $\leq n$ with the property that the partial differential equation $E(f) = 1$ has a solution. The asymptotic behavior of the size of the free part gives a measure for the singularity represented by $R$. We compute this invariant, called the differential signature, for invariant rings, toric monoid rings, determinantal rings, quadrics, and we compare it with the $F$- signature, which is an invariant in positive characteristic defined by looking at the asymptotic decomposition of the Frobenius. This is joint work with Jack Jeffries and $Luis N\acute{u}\tilde{n}ez-Betancourt$.