$\ell_1$ spreading models and the FPP for Cesàro mean nonexpansive maps

Abstract: Let $K$ be a nonempty subset of a Banach space $X$. A mapping $T\colon K\to K$ is called $\mathfrak{cm}$-nonexpansive if for any sequence $(u_i){i=1}^\infty$ and $y$ in $K$, $\limsup{i\to\infty} \sup_{A\subset{1,\dots, n}}|\sum_{k\in A} \big(T u_{i+k} - Ty\big)|\leq \limsup_{i\to\infty} \sup_{A\subset{1,\dots, n}}|\sum_{k\in A} (u_{i+k} - y)|$ for all $n\in\mathbb{N}$. As a subclass of the class of nonexpansive maps, its FPP is well-established in a wide variety of spaces. The main result of this paper is a fixed point result relating $\mathfrak{cm}$-nonexpansiveness, $\ell_1$ spreading models and Schauder bases with not-so-large basis constants. As a consequence, we deduce that Banach spaces with the weak Banach-Saks property have the fixed point property for $\mathfrak{cm}$-nonexpansive maps.