Dynamical systems method (DSM) for unbounded operators
Abstract
Let L be an unbounded linear operator in a real Hilbert space H, a generator of C0 semigroup, and g:H H be a C2loc nonlinear map. The DSM (dynamical systems method) for solving equ F(v):=Lv+gv=0 consists of solving the Cauchy problem u=(t,u), u(0)=u0, where is a suitable operator, and proving that i) ∃ u(t) ∀ t>0, ii) ∃ u(∞), and iii) F(u(∞))=0$.
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