Öz, Mehmet2016-08-042016-08-042016-03http://hdl.handle.net/10679/4433https://doi.org/10.1016/j.spl.2015.10.010Due to copyright restrictions, the access to the full text of this article is only available via subscription.We study a branching Brownian motion Z evolving in Rd, where a uniform field of Poissonian traps are present. We consider a general offspring distribution for Z and find the asymptotic decay rate of the annealed survival probability, conditioned on non-extinction. The method of proof is to use a skeleton decomposition for the Galton–Watson process underlying Z and to show that the particles of finite line of descent do not contribute to the survival asymptotics. This work is a follow-up to Öz and Çağlar (2013) and solves the problem considered therein completely.engrestrictedAccessarticle11021121600037462720003010.1016/j.spl.2015.10.010Branching Brownian motionPoissonian trapsRandom environmentHard obstacles