Weak extinction versus global exponential growth of total mass for superdiffusions

Abstract

Consider a superdiffusion X on Rd corresponding to the semilinear operator A(u)=Lu+β u-ku2, where L is a second order elliptic operator, β(·) is in the Kato class and bounded from above, and k(·) 0 is bounded on compact subsets of d and is positive on a set of positive Lebesgue measure. The main purpose of this paper is to complement the results obtained in Englander:2004, in the following sense. Let λ∞ be the L∞-growth bound of the semigroup corresponding to the Schr\"odinger operator L+β . If λ∞ ≠0, then we prove that, in some sense, the exponential growth/decay rate of \|Xt\|, the total mass of Xt, is λ∞ . We also describe the limiting behavior of (-λ∞ t)\|Xt\| in these cases. This should be compared to the result in Englander:2004, which says that the generalized principal eigenvalue λ2 of the operator gives the rate of local growth when it is positive, and implies local extinction otherwise. It is easy to show that λ∞ λ2, and we discuss cases when λ∞> λ2 and when λ∞= λ2. When λ∞ =0, and under some conditions on β, we give a sufficient and necessary condition for the superdiffusion X to exhibit weak extinction. We show that the branching intensity k affects weak extinction; this should be compared to the known result that k does not affect weak local extinction (which only depends on the sign of λ2, and which turns out to be equivalent to local extinction) of X.