Discontinuous critical Fujita exponents for the heat equation with combined nonlinearities

Abstract

We consider the nonlinear heat equation ut- u =|u|p+b |∇ u|q in (0,∞)× n, where n≥ 1, p>1, q≥ 1 and b>0. First, we focus our attention on positive solutions and obtain an optimal Fujita-type result: any positive solution blows up in finite time if p≤ 1+2n or q≤ 1+1n+1, while global classical positive solutions exist for suitably small initial data when p>1+2n and q> 1+1n+1. Although finite time blow-up cannot be produced by the gradient term alone and should be considered as an effect of the source term |u|p, this result shows that the gradient term induces an interesting phenomenon of discontinuity of the critical Fujita exponent, jumping from p=1+2n to p=∞ as q reaches the value 1+1n+1 from above. Next, we investigate the case of sign-changing solutions and show that if p 1+2n or 0<(q-1)(np-1) 1, then the solution blows up in finite time for any nontrivial initial data with nonnegative mean. Finally, a Fujita-type result, with a different critical exponent, is % also obtained for sign-changing solutions to the inhomogeneous version of this problem.