Law of iterated logarithm for supercritical non-symmetric branching Markov process

Abstract

Let \(Xt)t≥ 0, Pδx, x∈ E\ be a supercritical branching Markov process (which is not necessary symmetric) on a locally compact metric measure space (E,μ) with spatially dependent local branching mechanism. Under some assumptions on the semigroup of the spatial motion, we first prove law of iterated logarithm type results for f, Xt under the second moment condition on the branching mechanism, where f is a linear combination of eigenfunctions of the mean semigroup \Tt, t≥0\ of X. Then we prove law of iterated logarithm type results for f, Xt under the fourth moment condition, where f belongs to a larger class of functions.