Remarks on the Cauchy problem for the one-dimensional quadratic (fractional) heat equation

Abstract

We prove that the Cauchy problem associated with the one dimensional quadratic (fractional) heat equation: ut=Dx2α u u2,\; t∈ (0,T),\; x∈ or , with 0<α 1 is well-posed in Hs for s (-α,1/2-2α) except in the case α=1/2 where it is shown to be well-posed for s>-1/2 and ill-posed for s=-1/2 . As a by-product we improve the known well-posedness results for the heat equation (α=1) by reaching the end-point Sobolev index s=-1 . Finally, in the case 1/2<α 1 , we also prove optimal results in the Besov spaces Bs,q2.