Exact packing measure of the range of -Super Brownian motions

Abstract

We consider super processes whose spatial motion is the d-dimensional Brownian motion and whose branching mechanism is critical or subcritical; such processes are called -super Brownian motions. If d\!>\!2/(\!-\!1), where \!∈\!(1,2] is the lower index of at ∞, then the total range of the -super Brownian motion has an exact packing measure whose gauge function is g(r)\! =\! (1/r) / -1 ( (1/r 1/r)2), where \! =\! \! \! \!-1. More precisely, we show that the occupation measure of the -super Brownian motion is the g-packing measure restricted to its total range, up to a deterministic multiplicative constant only depending on d and . This generalizes the main result of Duq09 that treats the quadratic branching case. For a wide class of , the constant 2/(\!-\!1) is shown to be equal to the packing dimension of the total range.