Title: Quantum Steenrod operations and Fukaya categories

Abstract: This paper is concerned with quantum cohomology and Fukaya categories of a closed monotone symplectic manifold $X$, where we use coefficients in a field $\mathbf{k}$ of characteristic $p>0$. The first main result of this paper is that the quantum Steenrod operations $Q\Sigma$ admit an interpretation in terms of the Fukaya category of $X$, via suitable versions of the open-closed maps. Using this, we show that $Q\Sigma$, whose definition is intrinsic to characteristic $p$, is compatible with certain structures inherited from the quantum connection in characteristic $0$. We then turn to applications of these results. The first application is an arithmetic proof of the unramified exponential type conjecture for $X$ that satisfies Abouzaid's generation criterion over $\overline{\mathbb{Q}}$, which uses a reduction mod $p$ argument. Next, we demonstrate how the categorical perspective provides new tools for computing $Q\Sigma$ beyond the reach of known technology. We also explore potential connections of our work to arithmetic homological mirror symmetry.