Pavel Ostrovsky ``Ballistic transport in disordered graphene'' A. Schuessler, P. M. Ostrovsky, I. V. Gornyi, A. D. Mirlin, M. Titov An analytic theory of ballistic transport in disordered graphene in ``short-and-wide'' geometry is developed. We consider a sample of a large width and analyze the evolution of the conductance, the shot noise, and the full statistics of the charge transfer with increasing length at the Dirac point. We apply a special technique similar to the Keldysh Green function formalism. Both limits of weak Gaussian disorder and rare strong impurities are considered. The disorder perturbation theory is further combined with the renormalization group approach. We calculate disorder corrections to the full counting statistics of the sample both in ballistic and diffusive regimes and discuss the crossover between them. The universality of electron transport at the Dirac point is also discussed. Our analytic results are in a good agreement with the available numerical simulations of disordered graphene samples. [1] A. Schuessler, P. M. Ostrovsky, I. V. Gornyi, A. D. Mirlin, Phys. Rev. B 79, 075405 (2009).