The purpose of this paper is to introduce bi-parameter mixed Lipschitz spaces and characterize them via the Littlewood-Paley theory.As an application,we derive a boundedness criterion for singular integral operators i...The purpose of this paper is to introduce bi-parameter mixed Lipschitz spaces and characterize them via the Littlewood-Paley theory.As an application,we derive a boundedness criterion for singular integral operators in a mixed Journéclass on mixed Lipschitz spaces.Key elements of the paper are the development of the Littlewood-Paley theory for a special mixed Besov spaces,and a density argument for the mixed Lipschitz spaces in the weak sense.展开更多
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 p...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.展开更多
基金Supported by Zhejiang Provincial Natural ScienceFoundation of China(LQ22A010018)National Natural Science Foundation of China(12071437)。
文摘The purpose of this paper is to introduce bi-parameter mixed Lipschitz spaces and characterize them via the Littlewood-Paley theory.As an application,we derive a boundedness criterion for singular integral operators in a mixed Journéclass on mixed Lipschitz spaces.Key elements of the paper are the development of the Littlewood-Paley theory for a special mixed Besov spaces,and a density argument for the mixed Lipschitz spaces in the weak sense.
基金supported by NSFC(Nos.11471288,11371136 and 11671363)NSFZJ(LY14A010015)China Scholarship Council
文摘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.