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Time-dependent perturbation theory for abstract evolution equations of second order

Yuhua Lin — 1998

Studia Mathematica

A condition on a family B ( t ) : t [ 0 , T ] of linear operators is given under which the inhomogeneous Cauchy problem for u"(t)=(A+ B(t))u(t) + f(t) for t ∈ [0,T] has a unique solution, where A is a linear operator satisfying the conditions characterizing infinitesimal generators of cosine families except the density of their domains. The result obtained is applied to the partial differential equation u t t = u x x + b ( t , x ) u x ( t , x ) + c ( t , x ) u ( t , x ) + f ( t , x ) f o r ( t , x ) [ 0 , T ] × [ 0 , 1 ] , u ( t , 0 ) = u ( t , 1 ) = 0 f o r t [ 0 , T ] , u ( 0 , x ) = u 0 ( x ) , u t ( 0 , x ) = v 0 ( x ) f o r x [ 0 , 1 ] in the space of continuous functions on [0,1].

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