SEMILINEAR PARTIAL FUNCTIONAL DIFFERENTIAL EQUATIONS WITH THE NONLINEAR OPERATOR IS LIPSHITZ

  • Nguyen Thi Loan Faculty of Basic Science, Hung Yen University of Technology and Education
  • Tran Thi Hai Ly Faculty of Basic Science, Hung Yen University of Technology and Education

Abstract

On a Banach space X, we consider the semilinear partial functional differential equations of the form
KHCB-Loan.JPG                 (1)
where the mapping t → B(t) is a possibly unbounded operator such that the family (B(t))t≥0 generates an evolution family (U(t, s))t≥s≥0 have an exponential dichotomy; the operator h : BC(R+ , X ) → BC(R+ , X ) is Lipshitz; f (t)∈L(M, X ) ; xt is the history function defined by xt (s) := x(t + s) for s ∈[-θ , 0] . By using the Lipschitz of the nonlinear operator and the inequalities of evolution family in Banach spaces, we prove the equivalence of the two forms solutions to equation (1) as a mild solution and a Lyapunov-perron solution.

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Published
2022-09-30