A New Approach to Investigation of Evolution Differential Equations in Banach Spaces

Abstract

Known investigations of nonlinear evolution equations dx dt + A(t)x(t) = f(t)\ , x(t0) = x0,\ t0 t < ∞\ , (0.1) with monotone operators A(t) acting from reflexive Banach space B to dual space B*, usually assume that along with B and B* there is a Hilbert space H and continuous imbedding B H in the triplet B H B*\ ; (0.2) and that B is dense in H. The stabilization of solutions of evolution equations has been proven either in the sense of weak convergence in B or in the norm of H space, and only asymptotic estimates of stabilization rate have been obtained [15]. In the present paper we consider equations of type (0.1) without conditions (0.2) and establish stabilization with both

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