共查询到20条相似文献,搜索用时 109 毫秒
1.
设μ为R~d上的非负Radon测度,仅满足增长条件:对所有的x∈R~d,r0有μ(B(x,r))≦C_0r~n,其中C_0是一个固定的常数且0n≤d.在非双倍测度下,本文建立了Marcinkiewicz积分与Orlicz型函数生成的交换子和多线性交换子从L(logL)~(1/r)(μ)到弱L~1(μ)的有界性. 相似文献
2.
令μ是R~d上可能为非倍的正的Radon测度.对于所有的x∈R~d,r>0以及某个固定的常数C_0,μ只需满足μ(B(x,r))≤C_0r~n(0相似文献
3.
记μ为R~d上的非负Radon测度,且仅满足对固定的C_0>0和n∈(0,d],及所有的x∈R~d和r>0,μ(B(x,r))≤C_0r~n.作者建立了一类核函数满足H(o|¨)rmander条件的Marcinkiewicz积分与Lip_β(μ)(0<β)函数生成的交换子由L~p(μ)到L~q(μ),由L~p(μ)到Lip_(β-n/p)(μ)及L~(n/β)(μ)到RBMO(μ)有界.部分结论对经典Marcink(?)ewicz积分也是新的. 相似文献
4.
综述回顾了带有非倍测度的欧氏空间R~d上的Calderon-Zygmund理论中的基本结果.在该背景下欧氏空间上所赋予的测度μ不需要满足通常的双倍条件,只需满足如下增长性条件,即存在正常数n∈(0,d]以及C使得对任意的x∈R~d和r∈(0,∞),μ(B(x,r))≤Cr~n.回顾的主要结果包括:Hardy空间H~1(μ)与正则BMO空间RBMO(μ);与H~1(μ)以及RBMO(μ)相关的插值定理;Calderon-Zygmund分解;T(1)定理与Calderon-Zygmund算子在Lebesgue空间和Hardy空间上的有界性;Cotlar不等式与极大Calderon-Zygmund算子的有界性;多线性Calderon-Zygmund算子在乘积Lebesgue空间上的性质;Calderon-Zygmund算子的加权模不等式;由Calderon-Zygmund算子与RBMO(μ)函数所生成的交换子的有界性.此外,作者还介绍了该研究方面的一些最新进展与成果. 相似文献
5.
Guo-en HU~ Da-chun YANG~ 《中国科学A辑(英文版)》2007,50(11):1621-1641
Letμbe a nonnegative Radon measure on R~d which only satisfiesμ(B(x,r))≤C_0r~n for all x∈R~d,r>0,and some fixed constants C_0>0 and n∈(0,d].In this paper,some weighted weak type estimates with A_(p,(log L)~σ)~ρ(μ) weights are established for the commutators generated by Calder■n-Zygmund singular integral operators with RBMO(μ) functions. 相似文献
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一、β_t((?)~n)为{θ(s)|0≤s≤t}所生成的β((?)~n)的子σ-代数,为所有h_t(x,θ):R~ ×R~n×(?)~m→R~d(?)R~r的映射,并且满足 (1)它是β(R~ )×β(R~n)×β((?)~m)|β(R~d(?)R~r)可测的; (2)固定每个t,它是β(R~n)×β((?)~m)|β(R~d(?)R~r)可测的。 这里R~d(?)R~r是全体d×r矩阵,并且赋予它d·r维欧式空间的距离。 C~r(R~n)为R~n上具有r阶连续导数的函数的全体,C_0~r(R~n)为其中具有紧支集的函 相似文献
9.
Let μ be an Ahlfors-David probability measure on R~q;therefore,there exist some constants s_0 0 and ε_0,C_1,C_2 0 such that C_1ε~(s_0)≤μ(B(x,ε))≤C_2ε~(s_0) for all ε∈(0,ε_0) and x ∈ supp(μ).For n≥ 1,let α_n be an n-optimal set for μ of order r;furthermore,let {P_a(α_n)}_(a∈α_n) be an arbitrary Voronoi partition with respect to α_n.The n-th quantization error e_(n,r)(μ) for μ of order r can be defined as e_(n,r)~r(μ):=∫ d(x,α_n)~r dμ(x).We define I_a(α_n,μ):=∫_(P_a(α_n)) d(x,α_n)~r dμ(x),a ∈α_n,and prove that,the three quantities ■ are of the same order as that of 1/ne_(n,r)~r(μ).Thus,our result exhibits that,a weak version of Gersho's conjecture holds true for the Ahlfors-David probability measures on R~q. 相似文献
10.
设{x(t),t≥,0}是 R~d(d≥1)中的 Brown 运动,P_x(·)是自 x 出发的 Brown 运动所产生的 Wiener 测度,E_x(·)表示关于 P_x 的积分,D 是 R~d 中的一个给定的有界区域,τ_D 是 Brown运动 x(t)首出 D 的时刻,q 是 D 内的一个给定的有界 Hlder 连续函数.为了简单起见,我 相似文献
11.
记μ为上的非负Radon测度,且仅满足对固定的C0>0和n∈(0,d],及所有的和r>0, μ(B(x,r))≤C0 rn.作者建立了一类核函数满足Hörmander条件的Marcinkiewicz积分与Lipβ(μ)(0<β)函数生成的交换子由Lp(μ)到Lq(μ),由Lp(μ) 到Lipβ-n/p(μ)及Ln/β(μ)到RBMO(μ)有界.部分结论对经典 Marcinkiewicz积分也是新的.
相似文献
12.
讨论初值为u_0,v_0∈L_+~4(Ω),w∈W~(1,p)(Ω)(p≥2)时退化抛物型方程弱解的存在性.首先利用截断的方法将原问题正则化,化为u_0,v_0∈L_+~∞(Ω)的退化问题,接着对正则化问题的解做估计(这里的估计与具体的截断无关),最后利用弱收敛性,通过取极限的方法证明了原问题解的存在性. 相似文献
13.
该文研究椭圆型方程
{Δpu+m|u|p-2u-Δqu+n|u|q-2u=g(x, u), x∈RN,
u∈ W1, p(RN)∩W1, q(RN)
弱解在全空间RN上的衰减性, 其中m, n ≥ 0, N≥3, 1 < q < p < N, g(x, u)关于u满足类渐近线性. 证明了该方程的
弱解在无穷远处关于|x|呈指数衰减性. 相似文献
14.
New oscillation and nonoscillation theorems are obtained for the second order linear differential equationu″ + p(t)u = 0, wherep(t) ∈ C[0, ∞) andp(t) ≥ 0. Conditions only about the integrals ofp(t) on every interval [2nt0, 2n + 1t0] (n = 1, 2,…) for some fixedt0 > 0 are used in the results. 相似文献
15.
设P 是一个概率测度,ψ是一个复值可积函数,dμ =ψdP是一个复值测度. 在权函数ψ∈a1∩b∝+和Banach空间X 具有适当的凸性和光滑性的条件下, 作者证明了关于复测度μ 的X值拟鞅空间Dα(X) 和pQα(X) 上的原子分解定理. 并且利用复测度拟鞅的原子分解定理, 在0<α≤ 1 的情形, 证明了关于X 值复测度拟鞅的两个重要不等式. 相似文献
16.
Vladimir Umanskiy 《Advances in Mathematics》2003,180(1):176-186
Given p≠0 and a positive continuous function g, with g(x+T)=g(x), for some 0<T<1 and all real x, it is shown that for suitable choice of a constant C>0 the functional has a minimizer in the class of positive functions u∈C1(R) for which u(x+T)=u(x) for all x∈R. This minimizer is used to prove the existence of a positive periodic solution y∈C2(R) of two-dimensional Lp-Minkowski problem y1−p(x)(y″(x)+y(x))=g(x), where p∉{0,2}. 相似文献
17.
Flávio Dickstein 《Journal of Differential Equations》2006,223(2):303-328
We study the Cauchy problem for the nonlinear heat equation ut-?u=|u|p-1u in RN. The initial data is of the form u0=λ?, where ?∈C0(RN) is fixed and λ>0. We first take 1<p<pf, where pf is the Fujita critical exponent, and ?∈C0(RN)∩L1(RN) with nonzero mean. We show that u(t) blows up for λ small, extending the H. Fujita blowup result for sign-changing solutions. Next, we consider 1<p<ps, where ps is the Sobolev critical exponent, and ?(x) decaying as |x|-σ at infinity, where p<1+2/σ. We also prove that u(t) blows up when λ is small, extending a result of T. Lee and W. Ni. For both cases, the solution enjoys some stable blowup properties. For example, there is single point blowup even if ? is not radial. 相似文献
18.
设Ω是球面上函数,b是径向函数,ρ是实部正的复数;设Ψ为C~2([0,∞))的递增凸函数,Ψ(0)=0.本文研究非齐次粗糙核参数型Marcinkiewicz算子μ_(Ω,b)~ρ,以及旋转曲面上的非齐次粗糙核参数型Marcinkiewicz算子μ_(Ω,Ψ,b)~ρ,给出非齐次粗糙核Ω和b的最小光滑性条件,建立算子μ_(Ω,b)~ρ和μ_(Ω,Ψ,b)~ρ在Hardy空间和弱Hardy空间上的有界性.本文结果推进了先前b≡1情形的已有工作. 相似文献
19.
Satoru Fukasawa 《Geometriae Dedicata》2010,146(1):9-20
We consider the following problem: For a smooth plane curve C of degree d ≥ 4 in characteristic p > 0, determine the number δ(C) of inner Galois points with respect to C. This problem seems to be open in the case where d ≡ 1 mod p and C is not a Fermat curve F(p
e
+ 1) of degree p
e
+ 1. When p ≠ 2, we completely determine δ(C). If p = 2 (and C is in the open case), then we prove that δ(C) = 0, 1 or d and δ(C) = d only if d−1 is a power of 2, and give an example with δ(C) = d when d = 5. As an application, we characterize a smooth plane curve having both inner and outer Galois points. On the other hand,
for Klein quartic curve with suitable coordinates in characteristic two, we prove that the set of outer Galois points coincides
with the one of
\mathbbF2{\mathbb{F}_{2}} -rational points in
\mathbbP2{\mathbb{P}^{2}}. 相似文献