Stability properties for quasilinear parabolic equations with measure data
Abstract
Let be a bounded domain of RN, and Q= ×(0,T). We study problems of the model type \[ \ array [c]l% ut-pu=μ Q,\\ u=0 ∂×(0,T),\\ u(0)=u0 , array . \] where p>1, μ∈Mb(Q) and u0∈ L1(). Our main result is a stability theorem extending the results of Dal Maso, Murat, Orsina, Prignet, for the elliptic case, valid for quasilinear operators u(u)=div(A(x,t,∇ u)).
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