Notes on Regularity of Fourier integral operators with symbol in Sm0,δ
Abstract
Let Ta, be a Fourier integral operator defined with a∈ Sm0,δ(0≤δ<1) and ∈ 2 satisfying the strong non-degenerate condition. We demonstrate that when the order satisfies m≤-n2-npδ+np, the operator Ta, becomes bounded on Lp(Rn) for 2< p<∞ and maps L∞(Rn) to BMO(Rn) when p=∞. Furthermore, the derived bound on m is sharp for Lp estimates in the case δ=0, and for (L∞,BMO) when 0≤δ<1.
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