Generalized Invariant Subspaces for Infinite-Dimensional Systems

We study Lyapunov functions for infinite-dimensional dynamical systems governed by general maximal monotone operators. We obtain a characterization of Lyapunov pairs by means of the associated Hamilton-Jacobi partial differential equations, whose solutions are meant in the viscosity sense, as evolve

## Abstract This paper is devoted to the problem of chaotic behaviour of infinite‐dimensional dynamical systems. We give a survey of different approaches to study of chaotic behaviour of dynamical systems. We mainly discuss the ergodic‐theoretical approach to chaos which bases on the existence of i

Given an inner function % on the unit disk D, let K p % :=H p & %zÄ H p be the corresponding star-invariant subspace of the Hardy space H p . We are concerned with embedding theorems of the form K p % /L q (+), where + is a measure on D, and some related norm inequalities. In particular, assuming th

We prove uniqueness of "invariant measures," i.e., solutions to the equation L \* µ = 0 where L = ∆ + B • ∇ on R n with B satisfying some mild integrability conditions and µ being a probability measure on R n . This solves an open problem posed by S. R. S. Varadhan in 1980. The same conditions are s

We consider a two-player, zero-sum differential game governed by an abstract nonlinear differential equation of accretive type in an infinite-dimensional space. We prove that the value function of the game is the unique viscosity solution of the corresponding Hamilton᎐Jacobi᎐Isaacs equation in the s