One-sided H\"older regularity of global weak solutions of negative order dispersive equations

Abstract

We prove global existence, uniqueness and stability of entropy solutions with L2 L∞ initial data for a general family of negative order dispersive equations. It is further demonstrated that this solution concept extends in a unique continuous manner to all L2 initial data. These weak solutions are found to satisfy one sided H\"older conditions whose coefficients decay in time. The latter result controls the height of solutions and further provides a way to bound the maximal lifespan of classical solutions from their initial data.