摘要
Here we consider the following strongly singular integral TΩ,γ,α,βf(x,t)=∫R^ne^i|y|^-βΩ(y/|y|)/|y|^n+af(x-y,t-γ(|y|))dy, where Ω∈L^p(S^n-1),p〉1,n〉1,α〉0 and γis convex on (0,∞).We prove that there exists A(p,n) 〉 0 such that if β 〉 A(p,n) (1 +α), then TΩ,γ,α,β is bounded from L^2 (R^n+1) to itself and the constant is independent of γ Furthermore,when Ω∈ C^∞ (S^n-1 ), we will show that TΩ,γ,α,β is bounded from L^2 (R^n+l) to itself only if β〉 2α and the constant is independent of γ.
Here we consider the following strongly singular integral TΩ,γ,α,βf(x,t)=∫R^ne^i|y|^-βΩ(y/|y|)/|y|^n+af(x-y,t-γ(|y|))dy, where Ω∈L^p(S^n-1),p〉1,n〉1,α〉0 and γis convex on (0,∞).We prove that there exists A(p,n) 〉 0 such that if β 〉 A(p,n) (1 +α), then TΩ,γ,α,β is bounded from L^2 (R^n+1) to itself and the constant is independent of γ Furthermore,when Ω∈ C^∞ (S^n-1 ), we will show that TΩ,γ,α,β is bounded from L^2 (R^n+l) to itself only if β〉 2α and the constant is independent of γ.
基金
supported by NSFC(Nos.11471288,11371136 and 11671363)
NSFZJ(LY14A010015)
China Scholarship Council
