Splitting of algebraic fiber spaces with nef relative anti-canonical divisor and decomposition of $F$-split varieties

TL;DR

This paper proves that certain algebraic fiber spaces in positive characteristic split into products after a finite base change, and applies this to generalize Beauville-Bogomolov decomposition, study the abundance conjecture, and analyze rational points.

Contribution

It establishes splitting results for algebraic fiber spaces with nef anti-canonical divisors in positive characteristic, extending known decompositions and positivity theorems.

Findings

Fiber spaces split after finite base change under certain conditions.

Generalization of Beauville-Bogomolov decomposition to positive characteristic.

Varieties over finite fields with nef anti-canonical divisors have rational points.

Abstract

In this paper, we prove that an algebraic fiber space $f:X\to Y$ over a perfect field $k$ of characteristic $p>0$ with nef relative anti-canonical divisor $-K_{X/Y}$ splits into the product after taking the base change along a finite cover of $Y$, if the geometric generic fiber has mild singularities and if one of the following conditions holds: (i) $k\subseteq\overline{\mathbb F_p}$; (ii) $\pi^{et}(Y)$ is finite; (iii) $-K_X$ is semi-ample and $Y$ is an abelian variety. As its application, we generalize Patakfalvi and Zdanowicz's Beauville-Bogomolov decomposition in positive characteristic to the case when the anti-canonical divisor is numerically equivalent to a semi-ample divisor, which is applied to study the abundance conjecture in a new case and the fundamental group of an $F$-split variety with semi-ample anti-canonical divisor. We also show that a variety over a finite field with nef anti-canonical divisor satisfying some conditions has a rational point. Furthermore, to show the splitting theorem, we generalize partially Popa and Schnell's global generation theorem and Viehweg's weak positivity theorem to the case of generalized pairs in positive characteristic.