A Liouville-type theorem for the 3-dimensional parabolic Gross-Pitaevskii and related systems

Abstract

We prove a Liouville-type theorem for semilinear parabolic systems of the form ∂t ui- ui =Σj=1mβij uirujr+1, i=1,2,...,m in the whole space RN× R. Very recently, Quittner [ Math. Ann., DOI 10.1007/s00208-015-1219-7 (2015)] has established an optimal result for m=2 in dimension N≤ 2, and partial results in higher dimensions in the range p< N/(N-2). By nontrivial modifications of the techniques of Gidas and Spruck and of Bidaut-V\'eron, we partially improve the results of Quittner in dimensions N≥ 3. In particular, our results solve the important case of the parabolic Gross-Pitaevskii system -- i.e. the cubic case r=1 -- in space dimension N=3, for any symmetric (m,m)-matrix (βij) with nonnegative entries, positive on the diagonal. By moving plane and monotonicity arguments, that we actually develop for more general cooperative systems, we then deduce a Liouville-type theorem in the half-space RN+× R. As applications, we give results on universal singularity estimates, universal bounds for global solutions, and blow-up rate estimates for the corresponding initial value problem.