On the p-rank of singular curves and their smooth models

TL;DR

This paper investigates the p-rank and a-number of singular curves and their smooth models, providing formulas and bounds by analyzing Jacobians and their relations on surfaces with specific properties.

Contribution

It introduces a method to compute the p-rank of smooth models of singular curves using Jacobian group schemes and establishes relations between invariants for families of such curves.

Findings

Derived the p-rank of smooth models from Jacobian exact sequences

Established relations between p-rank and a-number for singular and smooth curves

Provided lower bounds for p-rank in certain curve families

Abstract

In this paper, we are concerned with the computation of the $p$-rank and $a$-number of singular curves and their smooth model. We consider a pair $X, X'$ of proper curves over an algebraically closed field $k$ of characteristic $p$, where $X'$ is a singular curve which lies on a smooth projective variety, particularly on smooth projective surfaces $S$ (with $p_g(S) = 0 = q(S)$) and $X$ is the smooth model of $X'$. We determine the $p$-rank of $X$ by using the exact sequence of group schemes relating the Jacobians $J_X$ and $J_{X'}$. As an application, we determine a relation about the fundamental invariants $p$-rank and $a$-number of a family of singular curves and their smooth models. Moreover, we calculate $a$-number and find lower bound for $p$-rank of a family of smooth curves.