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Abstract

Given a holomorphic or anti-holomorphic involution on a complex variety, the Smith inequality says that the total $\mathbb{F}_2$-Betti number of the fixed locus is no greater than the total $\mathbb{F}_2$-Betti number of the ambient variety. The involution is called maximal when the equality is achieved. In this paper, we investigate the existence problem for maximal involutions on higher-dimensional compact hyper-K\"ahler manifolds and on Hilbert schemes of points on surfaces. We show that for $n\geq 2$, a hyper-K\"ahler manifold of K3$^{[n]}$-deformation type admits neither maximal anti-holomoprhic involutions (i.e. real structures), nor maximal holomorphic (symplectic or anti-symplectic) involutions. In other words, such hyper-K\"ahler manifolds do not contain maximal (AAB), (ABA), (BAA) or (BBB)-branes. For Hilbert schemes of points on surfaces, we show that for a holomorphic (resp. anti-holomorphic) involution $\sigma$ on a smooth projective surface $S$ with $H^1(S, \mathbb{F}_2)=0$, the naturally induced involution on the $n$th Hilbert scheme of points is maximal if and only if $\sigma$ is a maximal involution of $S$ and it acts on $H^2(S, \mathbb{Z})$ trivially (resp. as $-\operatorname{id}$). This generalizes previous results of Fu and Kharlamov-R\u{a}sdeaconu.