一类多线性齐性算子的Hardy空间估计 *

证明了一类带齐性核的奇异积分算子的多线性算子是乘积空间L^p1×L^p2 ×…×L^pK(Rⁿ)到Hardy空间H^r(Rⁿ)和弱Hardy空间H^{r ,∞}(Rⁿ)的有界算子 .作为应用 ,获得了一类带齐性核的奇异积分算子交换子的L^p(Rⁿ)有界性 .     

可变核Marcinkiewicz积分交换子在Herz型Hardy空间上的有界性

该文研究由可变核Marcinkiewicz 积分和Lip_β (Rⁿ)(0 <β≤ 1)函数生成的交换子μ_{Ω, b}. 证明了当可变核Ω∈L^∞(Rⁿ)×L^r(S^n-1)(r≥1)$时, 交换子μ_{Ω, b}从Herz型Hardy空间到Herz空间的有界性. 同时建立了参数型Marcinkiewicz 积分的交换子μ^ρ_{Ω, b}在Herz型Hardy空间上的有界性.     

广义Morrey 空间上带变量核的Littlewood-Paley 算子

该文给出了一类带变量核的抛物型Littlewood-Paley 算子g_Φ 在 广义 Morrey 空间L^p,ω(Rⁿ)上的有界性. 作为上述结果的应用, 得到了g_Φ 与 BMO 函数 b(x)生成的交换子[b, g_Φ]在L^p,ω( Rⁿ)上的有界性.     

Marcinkiewicz积分及其交换子在H1(<SPAN style=

建立了Marcinkiewicz积分从Hardy空间H¹(Rⁿ´R^m)到Lebesgue空间L¹(Rⁿ´R^m)的有界性, 以及它们与Lipschitz函数所生成的交换子从Hardy空间L^Mq(Rⁿ´R^m)到Lebesgue空间H¹(Rⁿ´R^m)的有界性, 其中q>1.     

分数次积分算子交换子在Morrey 空间上的有界性特征

本文证明了: 如果分数次积分算子交换子[b, T_Ω,α] 从Morrey 空间L^p, ^λ(Rⁿ) 到L^q,^λ(Rⁿ) (1 n). 这个结果改进并推广了前人的结果.     

乘积空间上Marcinkiewicz积分的Lp有界性

本文证明了乘积空间Rⁿ×R^m上Marcinkiewicz积分μ_Ω（f）的L^p有界性,其中Ω∈L（log⁺L）^2β（S^n-1×S^m-1）,β>1.     

函数空间以及一类奇异积分算子在Hr(Rn)(p＜r≤1)中有界性的准则

在经典H^p(Rⁿ)空间原子分解理论基础上,给出了一种H^p(Rⁿ)空间的新的更为精细的刻划,籍此,给出了一类异奇积分算子在所有H^r(Rⁿ)(p＜r≤1)中有界性的准则     

与强奇异 Calderón-Zygmund 算子相关的Toeplitz型算子

研究与强奇异Calderón-Zygmund 算子和Lipschitz函数b∈Λ^&#8729;_β0（Rⁿ）相关的Toeplitz型算子T_b(f)从 L^p（Rⁿ）到L^q（Rⁿ） 的有界性和 L^p（Rⁿ）到F^&#8729;β₀,∞ _p的有界性,1/q=1/p-β₀/n. 得到了广义Toeplitz型算子Θ^b_α0 是 L^p（Rⁿ）到L^q（Rⁿ）有界的,1/q=1/p-(α₀+β₀)/n.上述结果包含了相应的交换子的有界性.同时还得到了与强奇异Calderón-Zygmund 算子和BMO函数b相关的 Toeplitz型算子 T_b(f)的L^p（Rⁿ）有界性, 1ápá∞ .     

Calderón-Zygmund分解的一种形式及其在算子内插中的应用

本文应用原子H~p(R~n)理论得到Calderón-Zygmund分解的一种形式,即对f(x)∈L^p(Rⁿ),p>1,及对任意00,有f(x)=g(x)+b(x),其中 应用这一结果给出了Fefferman和Stein关于H''(Rⁿ)和L^p(Rⁿ)之间算子内插定理及Coifman和Weiss关于H^p1(Rⁿ)和L^p2(Rⁿ)之间算子内插定理的简化证明,并推广了Strampacchia关于之间算子内插定理.     

乘积空间上Marcinkiewicz积分的Lp(Rm×Rn)有界性

研究乘积空间上Marcinkiewicz积分算子的L^p(R^m×Rⁿ)有界性. 对于固定的1L^p(R^m×Rⁿ)有界性成立的一个充分条件.     

Boundedness of Marcinkiewicz integrals and their commutators in H1(Rn×Rm)

The authors establish the boundedness of Marcinkiewicz integrals from the Hardy space H1(Rn × Rm) to the Lebesgue space L1(Rn × Rm) and their commutators with Lipschitz functions from the Hardy space H1(Rn × Rm) to the Lebesgue space Lq(Rn × Rm) for some q＞1.     

COMMUTATORS OF MULTIPLIERS ON HARDY SPACES

Let T be the multiplier operator associated to a multiplier m, and [b, T] be the commutator generated by T and a BMO function b. In this paper, the authors have proved that [b,T] is bounded from the Hardy space H^1（R^n） into the weak L^1 （R^n） space and from certain atomic Hardy space Hb^1 （R^n） into the Lebesgue space L^1 （R^n）, when the multiplier m satisfies the conditions of Hoermander type.     

Pullback attractors for non-autonomous reaction-diffusion equations on ?n

We study the long time behavior of solutions of the non-autonomous reaction-diffusion equation defined on the entire space Rn when external terms are unbounded in a phase space. The existence of a pullback global attractor for the equation is established in L2(Rn) and H1(Rn), respectively. The pullback asymptotic compactness of solutions is proved by using uniform a priori estimates on the tails of solutions outside bounded domains.     

Hardy spaces H_L~p(R~n) associated with operators satisfying k-Davies-Gaffney estimates

Let L be a one-to-one operator of type ω having a bounded H∞ functional calculus and satisfying the k-Davies-Gaffney estimates with k ∈ N. In this paper, the authors introduce the Hardy space HLp(Rn) with p ∈ (0, 1] associated with L in terms of square functions defined via {e-t2kL}t>0 and establish their molecular and generalized square function characterizations. Typical examples of such operators include the 2k-order divergence form homogeneous elliptic operator L1 with complex bounded measurable coefficients and the 2k-order Schrdinger type operator L2 := (-Δ)k + Vk, where Δ is the Laplacian and 0≤V∈Llock(Rn). Moreover, as an application, for i ∈ {1, 2}, the authors prove that the associated Riesz transform ▽k(Li-1/2) is bounded from HLip (Rn) to Hp(Rn) for p ∈ (n/(n + k), 1] and establish the Riesz transform characterizations of HL1p (Rn) for p ∈ (rn/(n + kr), 1] if {e-tL1 }t>0 satisfies the Lr-L2 k-off-diagonal estimates with r ∈ (1, 2]. These results when k := 1 and L := L1 are known.     

Characterization for commutators of n-dimensional fractional Hardy operators

In this paper, it was proved that the commutator Hβ,b generated by an n-dimensional fractional Hardy operator and a locally integrable function b is bounded from Lp1(Rn) to Lp2 (Rn) if and only if b is a C(M)O(Rn) function, where 1/p1 - 1/p2 = β/n, 1 ＜ p1 ＜∞, 0 ≤β＜ n. Furthemore,the characterization of Hβ,b on the homogenous Herz space (K)qα,p(Rn) was obtained.     

各向异性函数空间上的多线性算子的估计及其应用

设A是Rn上的各向异性伸缩,L是由各向异性Calderón-Zygmund算子生成的一般的多线性算子.本文得到L从加权Lebesgue空间Lp(Rn)到无权的各向异性Hardy空间HpA(Rn)的有界性.另外,对各向异性Hardy空间H1(Rn)和加权各向异性BMO空间BMOwA(Rn)得到包含关系:BMOX(Rn)(...     

Riesz Transforms Associated with Schrdinger Operators Acting on Weighted Hardy Spaces

Let L =-? + V be a Schrdinger operator acting on L2(Rn), n ≥ 1, where V ≡ 0 is a nonnegative locally integrable function on Rn. In this article, we will intropduce weighted Hardy spaces H L(w) associated with L by means of the square function and then study their atomic decomposition theory. We will also show that the Riesz transform ?L-1/2associated with L is bounded from our new space Hp L(w) to the classical weighted Hardy space Hp(w) when n/(n +1) p 1 and w ∈ A1∩ RH(2/p)′.     

Large time behavior of solutions for critical and subcritical complex Ginzburg-Landau equations in H~1

Considering the Cauchy problem for the critical complex Ginzburg-Landau equation in H1 (Kn), we shall show the asymptotic behavior for its solutions inAnalogous results also hold in the case that the nonlinearity has the subcritical power in H1(Rn), n≥1.     

On the Well-Posedness for Stochastic Schr(o)dinger Equations with Quadratic Potential

The authors investigate the influence of a harmonic potential and random perturbations on the nonlinear Schr(o)dinger equations.The local and global well-posedness are proved with values in the space ∑(Rn) =｛f ∈ H1(Rn),｜ · ｜f ∈ L2(Rn)}.When the nonlinearity is focusing and L2-supercritical,the authors give sufficient conditions for the solutions to blow up in finite time for both confining and repulsive potential.Especially for the repulsive case,the solution to the deterministic equation with the initial data satisfying the stochastic blow-up condition will also blow up in finite time.Thus,compared with the deterministic equation for the repulsive case,the blow-up condition is stronger on average,and depends on the regularity of the noise.If φ =0,our results coincide with the ones for the deterministic equation.     

极大奇异积分算子的一个BLO估计

本文研究以(Ω(x)/|z|n))为核的极大齐次奇异积分算子在空间BMO(R~n)上的性质,其中Ω是一个零阶齐次函数且在单位球面上均值为零．可以证明：若Ω满足某种最小尺度条件和某种L~1-Dini型正则性条件,则此极大奇异积分算子是由BMO(R~n)到BLO(R~n)的有界算子．