Non-existence of local solutions for semilinear heat equations of Osgood type

Abstract

We establish non-existence results for the Cauchy problem of some semilinear heat equations with non-negative initial data and locally Lipschitz, nonnegative source term f. Global (in time) solutions of the scalar ODE v=f(v) exist for v(0)>0 if and only if the Osgood-type condition ∫1∞ sf(s) =∞ holds; by comparison this ensures the existence of global classical solutions of ut= u+f(u) for bounded initial data u0∈ L∞(n). It is natural to ask whether the Osgood condition is sufficient to ensure that the problem still admits global solutions if the initial data is in Lq(n) for some 1 q<∞. Here we answer this question in the negative, and in fact show that there are initial conditions for which there exists no local solution in L1 loc(n) for t>0.