Single exponential H1-upper bounds for the primitive equations

Abstract

The three dimensional primitive equations with full viscosity are considered in a horizontally periodic box , which are subject to either the homogeneous Neumann or Dirichlet conditions on the upper and bottom parts of the boundary. For a strong solution v with initial data a, we establish a priori bounds in L∞(0, ∞; H1()) L2(0, ∞; H2()), the exponential part of which is (C \|a\|L2()2). This is in contrast to the upper bounds reported in the existing literature that are double exponential. Furthermore, the uniform-in-time estimate for the Neumann condition case, in which the Poincar\'e inequality is unavailable for v, seems to be new.