Existence and non-existence of global solutions for semilinear heat equations and inequalities on sub-Riemannian manifolds, and Fujita exponent on unimodular Lie groups

Abstract

In this paper we study the global well-posedness of the following Cauchy problem on a sub-Riemannian manifold M: equation* cases ut-LM u=f(u), \;x∈ M, \;t>0, \(0,x)=u0(x), \;x∈ M, cases equation* for u0≥ 0, where LM is a sub-Laplacian of M. In the case when M is a connected unimodular Lie group G, which has polynomial volume growth, we obtain a critical Fujita exponent, namely, we prove that all solutions of the Cauchy problem with u0 0, blow up in finite time if and only if 1<p≤ pF:=1+2/D when f(u) up, where D is the global dimension of G. In the case 1<p<pF and when f:[0,∞) [0,∞) is a locally integrable function such that f(u)≥ K2up for some K2>0, we also show that the differential inequality ut-LM u≥ f(u) does not admit any nontrivial distributional (a function u∈ Lploc(Q) which satisfies the differential inequality in D(Q)) solution u≥ 0 in Q:=(0,∞)× G. Furthermore, in the case when G has exponential volume growth and f:[0,∞)[0,∞) is a continuous increasing function such that f(u)≤ K1up for some K1>0, we prove that the Cauchy problem has a global, classical solution for 1<p<∞ and some positive u0∈ Lq( G) with 1≤ q<∞. Moreover, we also discuss all these results in more general settings of sub-Riemannian manifolds M.