We prove that the double ramification (DR) hierarchy of a homogeneous semisimple cohomological field theory (CohFT) with metric $\eta$ is bihamiltonian with respect to the Poisson operator $\eta^{-1} \partial_x$ and a second Poisson operator introduced in a previous work of ours in collaboration with S. Shadrin. This second Poisson operator has a simple and explicit expression in terms of the generating function of intersection numbers of the CohFT with the DR cycle and the top Hodge class $\lambda_g$. Our proof is based on two recently proved results: the equivalence of the double ramification hierarchy and the Dubrovin-Zhang hierarchy of a semisimple CohFT under Miura transformation and the polynomiality of the second Poisson bracket of the DZ hierarchy of a homogeneous semisimple CohFT. In particular our second Poisson bracket coincides through DR/DZ equivalence with the second Poisson bracket of the DZ hierarchy, hence providing a remarkably explicit approach to their bihamiltonian structure.
Comment: 18 pages