Global existence for a degenerate nonlinear diffusion problem with nonlinear gradient term and source
From MaRDI portal
Publication:1298159
DOI10.1007/S002080050313zbMath0926.35068OpenAlexW2047647146MaRDI QIDQ1298159
Publication date: 16 November 1999
Published in: Mathematische Annalen (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s002080050313
Nonlinear initial, boundary and initial-boundary value problems for linear parabolic equations (35K60) Degenerate parabolic equations (35K65)
Related Items (16)
EXISTENCE RESULTS FOR L1 DATA OF SOME QUASI-LINEAR PARABOLIC PROBLEMS WITH A QUADRATIC GRADIENT TERM AND SOURCE ⋮ Singular parabolic equations with measures as initial data ⋮ \(L^\infty\) estimates of solutions for the quasilinear parabolic equation with nonlinear gradient term and \(L^1\) data ⋮ On the Cauchy problem for the evolution \(p\)-Laplacian equations with gradient term and source ⋮ Blow-up rate estimate for degenerate parabolic equation with nonlinear gradient term ⋮ Properties of solutions to porous medium problems with different sources and boundary conditions ⋮ Blow-up time estimate for a degenerate diffusion equation with gradient absorption ⋮ Doubly nonlinear parabolic equations with measure data ⋮ Quasi-linear diffusion equations with gradient terms and \(L^{1}\) data. ⋮ Quasi-linear diffusion equations with gradient terms and \(L^1\) data ⋮ An Age and Spatially Structured Population Model forProteus MirabilisSwarm-Colony Development ⋮ Compact attractors for evolution problems without uniqueness ⋮ Global existence and comparison theorem for a nonlinear parabolic equation ⋮ Doubly degenerate parabolic equation with time-dependent gradient source and initial data measures ⋮ Existence results for quasilinear elliptic and parabolic problems with quadratic gradient terms and sources ⋮ Blow-up analysis for parabolic \(p\)-Laplacian equations with a gradient source term
This page was built for publication: Global existence for a degenerate nonlinear diffusion problem with nonlinear gradient term and source
