Asymptotic integration of a problem of convection (Q749408)

The present work arose in connection with the construction of higher approximations of the method of averaging for a problem of convection. It has been found that the determination of higher approximations is reduced to asymptotic integration of a problem of the type \(\partial v/\partial t-\nu \Delta v+(v,\nabla)a+(a,\nabla)v+\nabla p+{\mathcal L}(T)=f(x,t,\omega),\partial T/\partial t-\chi \Delta T+(b,\nabla T)+(v,c)=f_ 1(x,t,\omega),\quad div v=0,v|_{{\dot \Omega}}=0,\quad T|_{{\dot \Omega}}=0,\quad \int_{{\dot \Omega}}pdx=0,\)where \(\Omega\) is a bounded simply connected region with \(C^{\infty}\)-smooth boundary \({\dot \Omega}\). The consideration of this question seems to be of independent interest. That is what we are now going to deal with. The problem is formulated in Sec. 1, and the algorithm of the construction of asymptotic approximations is investigated in Secs. 2-4, while in Sec. 5, asymptotic estimates are obtained in terms of arbitrarily smooth Hölder norms.