Stationary solutions for a 1D PDE problem with gradient term and negative powers nonlinearity
DOI10.1007/s41808-022-00180-xOpenAlexW4292411272WikidataQ114217423 ScholiaQ114217423MaRDI QIDQ2091763
Publication date: 2 November 2022
Published in: Journal of Elliptic and Parabolic Equations (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s41808-022-00180-x
asymptotic behaviorstationary solutionPoincaré-Lyapunov compactificationgradient term and negative powers nonlinearity
Topological structure of integral curves, singular points, limit cycles of ordinary differential equations (34C05) Asymptotic properties of solutions to ordinary differential equations (34D05)
Related Items (2)
Cites Work
- Variational approach to MEMS model with fringing field
- Multiple time scale dynamics
- Polynomial Liénard equations near infinity
- Quasi traveling waves with quenching in a reaction-diffusion equation in the presence of negative powers nonlinearity
- Radial symmetric stationary solutions for a MEMS type reaction-diffusion equation with spatially dependent nonlinearity
- The structure of stationary solutions to a micro-electro mechanical system with fringing field
- Traveling wave solutions for degenerate nonlinear parabolic equations
- Estimates for the quenching time of a MEMS equation with fringing field
- Geometric treatments and a common mechanism in finite-time singularities for autonomous ODEs
- Qualitative theory of planar differential systems
- Analysis of the Dynamics and Touchdown in a Model of Electrostatic MEMS
- On MEMS equation with fringing field
- On Blow-Up Solutions of Differential Equations with Poincaré-Type Compactifications
- Global existence and quenching for a damped hyperbolic MEMS equation with the fringing field
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