On a Functional Analysis Approach to Parabolic Equations in Infinite Dimensions

We prove that if \(X\) is a Banach space which admits a smooth Lipschitzian bump function. then for every lower semicontinuous bounded below function \(f\), there exists a Lipschitzian smooth function \(g\) on \(X\) such that \(f+g\) attains its strong minimum on \(X\), thus extending a result of Bo

This paper deals with the problem of finite-dimensional estimation of functional parameters in a parabolic distributed system from the information theoretic viewpoints. A maximum likelihood estimator based on the Bayesian procedure is derived for overcoming the ill-posedness and its bias is evaluate

dedicated to professor leonard gross on the occasion of his 70th birthday Functions of bounded variation (BV functions) are defined on an abstract Wiener space (E, H, +) in a way similar to that in finite dimensions. Some characterizations are given, which justify describing a BV function as a funct

In this work, we consider a new approach to the practical stability theory of impulsive functional differential equations. With Lyapunov functionals and Razumikhin technique, we use a new technique in the division of Lyapunov functions, given by Shunian Zhang, and obtain conditions sufficient for th