Weighted weak-type (1, 1) inequalities for pseudo-differential operators with symbol in Sm0,δ
Abstract
Let Ta be a pseudo-differential operator defined by exotic symbol a in H\"ormander class Sm0,δ with m ∈ R and 0 ≤ δ ≤ 1 . It is well-known that the weak type (1,1) behavior of Ta is not fully understood when the index m is equal to the possibly optimal value -n2 - n2 δ for 0 ≤ δ < 1 , and that Ta is not of weak type (1,1) when m = -n and δ = 1 . In this note, we prove that Ta is of weighted weak type (1,1) if a ∈ S-n0, δ with 0 ≤ δ < 1 . Additionally, we show that the dual operator Ta* is of weighted weak type (1,1) if a ∈ L∞ S-n0 . We also identify m = -n as a critical index for these weak type estimates. As applications, we derive weighted weak type (1,1) estimates for certain classes of Fourier integral operators.
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