【 摘 要 】

We consider a class of quasilinear parabolic equations whose model is the heat equation corresponding to the p-Laplacian operator, u = Delta (p)u: = Sigma (d)(i=1) partial derivative (i)(\ delu \ (p similar to2) partial derivative (i)u) with p epsilon [2, d), on a domain D subset of R-d of finite measure. We prove that \u(t, x)\ less than or equal to c \D \ (alpha) t(-beta) parallel tou(0)parallel to (7)(r) for all t > 0, x epsilon D and for all initial data u(0) epsilon L'(D), provided r is not smaller than a suitable r(0) where alpha, beta, gamma are positive constants explicitly computed in terms of d, p, r. The nonlinear cases associated with the case p = 2 display exactly the same contractivity properties which hold for the linear heat equation. We also show that the nonlinear evolution considered is contractive on any L-q space for any q epsilon [2, + infinity]. (C) 2001 Academic Press.

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