Physical measures for mostly sectional expanding flows

We prove that a partially hyperbolic attracting set for a $C^2$ vector field supports an ergodic physical/SRB measure if, and only if, the trapping region admits non-uniform sectional expansion on a positive Lebesgue measure subset. Moreover, in this case, the attracting set supports at most finitely many ergodic physical/SRB measures, which are also Gibbs states along the central-unstable direction. This extends to continuous time systems a similar well-known result obtained for diffeomorphisms, encompassing the presence of equilibria accumulated by regular orbits within the attracting set, since it is shown that slow recurrence to hyperbolic saddle-type equilibria is automatic for Lebesgue almost every point. We present several examples of application, including the existence of physical measures for asymptotically sectional hyperbolic attracting sets.