A Seeger-Sogge-Stein theorem for bilinear Fourier integral operators
Abstract
We establish the regularity of bilinear Fourier integral operators with bilinear amplitudes in Sm1,0 (n,2) and non-degenerate phase functions, from Lp × Lq Lr under the assumptions that m≤ -(n-1)(|1p-12|+|1q-12|) and 1p+1q=1r. This is a bilinear version of the classical theorem of Seeger-Sogge-Stein concerning the Lp boundedness of linear Fourier integral operators. Moreover, our result goes beyond the aforementioned theorem in that it also includes the case of non-Banach target spaces.
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