Higher integrability estimates for parabolic PDEs with fast or slow diffusion

Abstract: In the talk we discuss some recent results on self-improving properties for gradients of solutions for parabolic evolutions with fast or slow diffusion. The model case is the porous medium equation. We show how local higher integrability estimates can be derived via the celebrated Gehring lemma. The estimates rely on a Calderon Zygmund theory that is developed with respect to an intrinsic metric that depends on the solution; taking into account the local speed of the diffusion. The concept turns out to be flexible enough to show self-improving properties for large classes of diffusions depending on the solution and the gradient.

analysis of PDEs

Audience: researchers in the topic

Leipzig Oberseminar Analysis - Probability

Series comments: Description: Research seminar on analysis and probability

One day before the seminar, an announcement with the link will be sent to the mailing list of the Oberseminar. To receive these e-mails, please contact Jonas Sauer (see the talk's abstract via the external homepage for a link).