Lorenzo Giacomelli, Salvador Moll, Francesco Petitta
Published 2021-02-04Version 1
We consider a prototypical nonlinear parabolic equation whose flux has three distinguished features: it is nonlinear with respect to both the unknown and its gradient, it is homogeneous, and it depends only on the direction of the gradient. For such equation, we obtain existence and uniqueness of entropy solutions to the Dirichlet problem, the homogeneous Neumann problem, and the Cauchy problem. Qualitative properties of solutions, such as finite speed of propagation and the occurrence of waiting-time phenomena, with sharp bounds, are shown. We also discuss the formation of jump discontinuities both at the boundary of the solutions' support and in the bulk.
A New Formula for Entropy Solutions for Scalar Hyperbolic Conservation Laws: Convexity Degeneracy of Flux Functions and Fine Properties of Solutions
Curves of steepest descent are entropy solutions for a class of degenerate convection-diffusion equations
Global existence to a $3D$ chemotaxis-Navier-stokes system with nonlinear diffusion and rotation
![QR code for arXiv:2102.02587 [math.AP]](http://oss.arxitics.com/images/favicon.svg)