It is quite easy to construct a dynamical system which has a physical measure with a positive Lyapunov exponent and zero entropy, just a figure $\infty$ system. By Pesin's entropy formula such a measure can not be a Sinai-Ruelle-Bowen measure. Now my question is, if there exists a system with a physical measure with positive entropy that is not a SRB-measure.  I think the answer is Yes, but I did not manage the construction of such a system. 
(Perhaps I have to add that I am interested in ergodic and hyperbolic physical measures that are not SRB)