A general nonlinear characterization of stochastic incompleteness

Abstract

Stochastic incompleteness of a Riemannian manifold M amounts to the nonconservation of probability for the heat semigroup on M. We show that this property is equivalent to the existence of nonnegative, nontrivial, bounded (sub)solutions to W=(W) for one, hence all, general nonlinearity which is only required to be continuous, nondecreasing, with (0)=0 and >0 in (0,+∞). Similar statements hold for unsigned (sub)solutions. We also prove that stochastic incompleteness is equivalent to the nonuniqueness of bounded solutions to the nonlinear parabolic equation ∂t u =φ(u) with bounded initial data for one, hence all, general nonlinearity φ which is only required to be continuous, nondecreasing and nonconstant. Such a generality allows us to deal with equations of both fast-diffusion and porous-medium type, as well as with the one-phase and two-phase classical Stefan problems, which seem to have never been investigated in the manifold setting.