A New Proof About Certain Oscillatory Singular Integrals with Nonstandard Kernel

Abstract

In the paper, we provide a new method to study the oscillatory singular integral operator TQ,A with nonstandard kernel defined by \[TQ,A f(x)= p.v. ∫Rn f(y) (x-y)|x-y|n+1(A(x)-A(y)-∇ A(y)(x-y)) ei Q(|x-y|) d y, \] where Q(t)=Σ1 i m aitαi(ai∈R and ai≠ 0, αi∈ N) , and is a homogeneous function of degree zero on Rn and satisfies the vanishing moment condition. Under the condition that ∈ L(logL)2(Sn-1) and ∇ A∈ BMO(Rn), the authors show that TQ,A is bounded on Lp(Rn) with a uniform boundedness, which improves and extends the previous results.