Endpoint regularity of general Fourier integral operators

Abstract

Let n≥ 1,0<<1, \,1-\≤ δ≤ 1 and m1=-n+(n-1)\ 12,\+ 1-δ2. If the amplitude a belongs to the H\"ormander class Sm1,δ and φ∈ 2 satisfies the strong non-degeneracy condition, then we prove that the following Fourier integral operator Tφ,a defined by align* Tφ,af(x)=∫Rneiφ(x,)a(x,)f()d, align* is bounded from the local Hardy space h1(Rn) to L1(Rn). As a corollary, we can also obtain the corresponding Lp(Rn)-boundedness when 1<p<2. These theorems are rigorous improvements on the recent works of Staubach and his collaborators. When 0≤ ≤ 1,δ≤ \,1-\, by using some similar techniques in this note, we can get the corresponding theorems which coincide with the known results.