Application BMO type space to parabolic equations of Navier-Stokes type with the Neumann boundary condition

Abstract

Let L be a Neumann operator of the form L=-N acting on L2( Rn). Let BMO_N( Rn) denote the BMO space on Rn associated to the Neumann operator . In this article we will show that a function f∈ BMO_N( Rn) is the trace of the solution of Lu=ut+L u=0, u(x,0)= f(x), where u satisfies a Carleson-type condition eqnarray* xB, rB rB-n∫0rB2∫B(xB, rB) |∇ u(x,t)|2 dx dt ≤ C <∞, eqnarray* for some constant C>0. Conversely, this Carleson condition characterizes all the L-carolic functions whose traces belong to the space BMO_N( Rn). This result extends the analogous characterization founded by E. Fabes and U. Neri in (Duke Math. J. 42 (1975), 725-734) for the classical BMO space of John and Nirenberg. Furthermore, based on the characterization of BMO_N( Rn) space mentioned above, we prove global well-posedness for parabolic equations of Navier-Stokes type with the Neumann boundary condition under smallness condition on intial data u0∈ BMO_N-1( Rn), which is motivated by the work of P. Auscher and D. Frey (J. Inst. Math. Jussieu 16(5) (2017), 947-985).