Wolf Jung Core entropy and biaccessibility of quadratic polynomials (637K, pdf) ABSTRACT. For complex quadratic polynomials, the topology of the Julia set and the dynamics are understood from another perspective by considering the Hausdorff dimension of biaccessing angles and the core entropy: the topological entropy on the Hubbard tree. These quantities are related according to Thurston. Tiozzo [arXiv:1305.3542] has shown continuity on principal veins of the Mandelbrot set M . This result is extended to all veins here, and it is shown that continuity with respect to the external angle theta will imply continuity in the parameter c . Level sets of the biaccessibility dimension are described, which are related to renormalization. H\"older asymptotics at rational angles are found, confirming the H\"older exponent given by Bruin--Schleicher [arXiv:1205.2544]. Partial results towards local maxima at dyadic angles are obtained as well, and a possible self-similarity of the dimension as a function of the external angle is suggested.