Lp boundedness of pseudo-differential operators with symbols in Sn(-1)/2,1

Abstract

For symbol a∈ Sn(-1)/2,1 the pseudo-differential operator Ta may not be L2 bounded. However, under some mild extra assumptions on a, we show that Ta is bounded from L∞ to BMO and on Lp for 2≤ p<∞. A key ingredient in our proof of the L∞-BMO boundedness is that we decompose a cube, use x-regularity of the symbol and combine certain L2, L∞ and L∞-BMO boundedness. We use an almost orthogonality argument to prove an L2 boundedness and then interpolation to obtain the desired Lp boundedness.