A condition for blow-up solutions to discrete \(p\)-Laplacian parabolic equations under the mixed boundary conditions on networks
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Publication:2108413
DOI10.1186/S13661-019-01294-3OpenAlexW3100948673WikidataQ126744009 ScholiaQ126744009MaRDI QIDQ2108413
Jaeho Hwang, Min-Jun Choi, Soon-Yeong Chung
Publication date: 19 December 2022
Published in: Boundary Value Problems (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1901.03075
Reaction-diffusion equations (35K57) Discrete version of topics in analysis (39A12) Semilinear parabolic equations with Laplacian, bi-Laplacian or poly-Laplacian (35K91) Initial-boundary value problems for nonlinear first-order PDEs (35F31)
Cites Work
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- Blow-up and global solutions for a class of nonlinear reaction diffusion equations under Dirichlet boundary conditions
- Multiple solutions for a discrete boundary value problem involving the \(p\)-Laplacian
- Blowup in diffusion equations: A survey
- On the existence of positive solutions of \(p\)-Laplacian difference equations.
- Finite difference-finite element approach for solving fractional Oldroyd-B equation
- A new condition for blow-up solutions to discrete semilinear heat equations on networks
- A new condition for the concavity method of blow-up solutions to \(p\)-Laplacian parabolic equations
- Some nonexistence and instability theorems for solutions of formally parabolic equations of the form \(Pu_t=-Au+ {\mathfrak F} (u)\)
- A note on blow up of solutions of a quasilinear heat equation with vanishing initial energy.
- The discrete \(p\)-Schrödinger equations under the mixed boundary conditions on networks
- Critical blow-up and global existence for discrete nonlinear \(p\)-Laplacian parabolic equations
- Existence and nonexistence of solutions for \(u_ t=\text{div}(|\nabla u|^{p-2}\nabla u)+f(\nabla u,u,x,t)\)
- A complete characterization of the discrete \(p\)-Laplacian parabolic equations with \(q\)-nonlocal reaction with respect to the blow-up property
- Comparison principles for thep-Laplacian on nonlinear networks
- $\omega$-Harmonic Functions and Inverse Conductivity Problems on Networks
- Some remarks on the asymptotic behaviour of the solutions of a class of parabolic problems
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