Multi-dimensional Burgers equation with unbounded initial data: well-posedness and dispersive estimates

Abstract

The Cauchy problem for a scalar conservation laws admits a unique entropy solution when the data u0 is a bounded measurable function (Kruzhkov). The semi-group (St)t0 is contracting in the L1-distance. For the multi-dimensional Burgers equation, we show that (St)t0 extends uniquely as a continuous semi-group over Lp(Rn) whenever 1 p<∞, and u(t):=Stu0 is actually an entropy solution to the Cauchy problem. When p q ∞ and t>0, St actually maps Lp(Rn) into Lq(Rn). These results are based upon new dispersive estimates. The ingredients are on the one hand Compensated Integrability, and on the other hand a De Giorgi-type iteration.