Normal blow-ups and their expected defining equations

We construct solutions of gu=e u which blow-up precisely on a given space-like hypersurface of class H s . For this purpose, we prove a general existence theorem for Fuchsian PDE in Sobolev spaces. The precise relation between the regularity of the data and that of the solution is shown to involve l

We prove nonexistence results for the Cauchy problem for the abstract hyperbolic equation in a Banach space X , where f : X → R is a C 1 -function. Several applications to the second-and higher-order hyperbolic equations with local and nonlocal nonlinearities are presented. We also describe an appr

This paper is concerned with the Cauchy problem for the fast diffusion equation u t -∆u m = αu p 1 in R N (N ≥ 1), where m ∈ (0, 1), p 1 > 1 and α > 0. The initial condition u 0 is assumed to be continuous, nonnegative and bounded. Using a technique of subsolutions, we set up sufficient conditions o