Higher-order spectral analysis and weak asymptotic stability of convex processes (Q2368673)

In this very well written and interesting paper, the authors study the asymptotic stability of a discrete dynamical inclusion \(x(k+1) \in F(x(k))\) in a Hilbert space, where the multivalued operator \(F : H \to H\) is a convex process. They provide necessary and sufficient conditions for weak asymptotic stability. Moreover, they derive sharp estimates for \(K_\infty(F)\), the asymptotic null-controllability set of \(F\), using higher-order spectral analysis and the adjoint of \(F\). More precisely, they obtain the lower estimate \[ \text{co}\biggl(\bigcup_{r \in (-1,1)} R_F(r)\biggr) \subset K_\infty(F), \] where \(R_F(r)\) is the union of \(n\)-order resolvent (resp., bilateral resolvent) of \(F\) for \(r \in (0,1)\) (resp., \(r \in (-1,0)\)). They also obtain upper estimates involving the \(n\)-order resolvents and bilateral resolvents of the adjoint of \(F\).