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胡迪鹤 《数学物理学报(A辑)》1990,(4)
本文引进了向量维Hausdorff测度及其维向量的概念,研究了向量维Hausdorff测度的基本性质及其与经典Hausdorff测度(其维数为广义非负实数)的关系,引进两种类型的维向量,研究了它们之间的关系及其与经典Hausdorff维数的关系。 相似文献
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令X(t)=(X_1(t),…,X_N(t))为一d-维过程,其中X_i(t)为α_i-阶d_i-维稳定过程.设0<α_n<…<α_1≤2,d=d_1 … d_N.本文中,我们获得了,当α_1≤d_1时稳定分量过程X(t)关于Borel集E的象X(E)的Hausdorff测度和Packing测度的一致上界和一致下界,当α_1>d_1时得到了相应测度的一个一致上界.同时我们给出了一致维数结果. 相似文献
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Haudorff测度与等径不等式 总被引:1,自引:0,他引:1
对于:Hausdorff维数为s>0的满足开集条件的自相似集E(?)Rn(n>1),我们引入等径不等式Hs|E(X)≤|X|s,以及使该不等式等号成立而直径大于0的极限集U(?)Rn.这里,Hs|E(·)是限制到集合E上的s维Hausdorff测度,而|X|指集合X在欧氏度量下的直径.当s=n时,n维球是唯一的极限集;当s∈(1,n)时,除去一些反面例子以外,我们对上述等径不等式的极限集的基本性质所知甚少.可以看出,这些不等式与Hs(E)的准确值的计算有密切联系.作为特例,我们将考虑Sierpinski垫片,指出计算这一典型自相似集的In2/In3维Hausdorff测度准确值的困难何在.由此可以大致推想,为什么除去平凡情形以外,至今还没有一个具体的满足开集条件而维数大于1的自相似集的:Hausdorff测度准确值被计算出来. 相似文献
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关于满足强分离开集条件的自相似集的Hausdorff测度 总被引:6,自引:0,他引:6
设E是Rn中由相似压缩S1,S2,…,Sm所确定的满足开集条件的自相似集,其Hausdorff维数为s,其s-维Hausdorff测度记为Hs(E).利用部分估计原理得到了本文的主要结果:若E满足强分离开集条件,则在E中存在一个压缩拷贝串序列{Ui}和紧集U(|U|>0),使得Hs(U)等于|U|s,并且{Ui}按Hausdorff度量收敛到U,进而证明了由U可以构造一个数列,使得该数列正好收敛到Hs(E);另外,引入了自相似集的相似压缩不动点,得到了等式Hs(E∩U)=|U|s 成立的一个必要条件. 相似文献
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《数学进展》2017,(1)
在[Adv.Math.(China),2015,44(3):335-353]中,我们研究了经典Bargmann空间Bo中的非自伴算子H_μ:H_μ=S_μ+H_λ,其中S_μ=μz d/(dz),H_λ=iλ(z(d~2)/(dz~2)+z~2 d/(dz)),i~2=-1,参数μ,λ都是实数.我们给出了H_μ的谱分析和H_μ的广义特征向量的渐近分析.设ek(z)=(z~k)/((k!)~(1/2)),k=1,2,…是B0的正交基.算子H_μ可以被一列三对角矩阵逼近,此三对角矩阵的主对角线元素为β_k=μk,次对角线元素α_k=iλk(k+1)~(1/2),1≤k≤n,n∈N.对于μ∈C和λ∈C,本文主要研究上述矩阵的特征值z_(k,n)(μ,λ)的局部化,它是多项式P_(n+1)~(μ,λ)(z)的零点,P_(n+1)~(μ,λ)(z)满足三项递推关系:若"∈R和λ∈R,则上述矩阵是复对称的.在这种情况下,我们证明了R上有界变分复值函数∈(z)的存在性,它使得权重为∈(z)的多项式P_n~(μ,λ)(z)是正交的.我们也考虑了H_μ的扰动H_λ'=S_λ'+H_λ,其中S_λ'=λ'z~2(d~2)/(dz~2)+S_μ,λ'∈R,H_λ可以被矩阵(h_(jk)~λ)_(j,k=1)~∞表示.证明了可以通过S_λ'的特征值和有限矩阵(h_(jk)~λ)_(j,k=1)~n的特征值的组合来逼近H_λ'的特征值. 相似文献
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《数学物理学报(A辑)》2016,(6)
考虑反铁磁链对应的金刚石型等级晶格上的λ-态Potts模型的配分函数零点的极限点集,这极限点集被证明是一族有理函数T_λ(z)的Julia集J(T_λ(z)).该文得到当λ→∞时,其Julia集J(T_λ(z))的Hausdorff维数的渐近估计,即J(T_λ(z))的Hausdorff维数的一个下界估计,另外研究这族有理函数的Julia集的其他拓扑性质. 相似文献
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Shmuel Kantorovitz 《Semigroup Forum》2004,68(2):308-310
Let $T(\cdot)$ be an analytic $C_0$-semigroup of operators
in a sector $S_{\theta}$, such that $||T(\cdot)||$ is bounded in each
proper subsector $S_{\theta_0}$. Let $A$ be its generator, and let
$D^{\infty}(A)$ be its set of $C^{\infty}$-vectors. It is observed that
the (general) Cauchy integral formula implies the following extension
of Theorem 5.3 in [1] and Theorem 1 in [4]: for each proper subsector
$S_{\theta_0}$, there exist positive constants $M,\,\delta$ depending only
on $\theta_0$, such that $(\delta^n/n!)||z^nA^nT(z)x||\leq M\,||x||$
for all $n\in\Bbb N,\, z\in S_{\theta_0}$, and $x\in D^{\infty}(A)$.
It follows in particular that the vectors $T(z)x$ (with $z\in S_{\theta}$
and $x\in D^{\infty}(A)$) are analytic vectors for $A$ (hence $A$ has
a dense set of analytic vectors). 相似文献
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In this paper, we investigate the third Hankel determinant H_3(1) for the class H_σ~μ(λ, φ)(λ≥ 1, μ≥ 1) of Ma-Minda bi-univalent functions in the open unit disk D = {z : |z| 1} and obtain the upper bound of the above determinant H_3(1). 相似文献
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Let β 〉 0 and Sβ := {z ∈ C : |Imz| 〈β} be a strip in the complex plane. For an integer r ≥ 0, let H∞^Г,β denote those real-valued functions f on R, which are analytic in Sβ and satisfy the restriction |f^(r)(z)| ≤ 1, z ∈ Sβ. For σ 〉 0, denote by Bσ the class of functions f which have spectra in (-2πσ, 2πσ). And let Bσ^⊥ be the class of functions f which have no spectrum in (-2πσ, 2πσ). We prove an inequality of Bohr type
‖f‖∞≤π/√λ∧σ^r∑k=0^∞(-1)^k(r+1)/(2k+1)^rsinh((2k+1)2σβ),f∈H∞^r,β∩B1/σ,
where λ∈(0,1),∧and ∧′are the complete elliptic integrals of the first kind for the moduli λ and λ′=√1- λ^2,respectively,and λ satisfies
4∧β/π∧′=1/σ.
The constant in the above inequality is exact. 相似文献
‖f‖∞≤π/√λ∧σ^r∑k=0^∞(-1)^k(r+1)/(2k+1)^rsinh((2k+1)2σβ),f∈H∞^r,β∩B1/σ,
where λ∈(0,1),∧and ∧′are the complete elliptic integrals of the first kind for the moduli λ and λ′=√1- λ^2,respectively,and λ satisfies
4∧β/π∧′=1/σ.
The constant in the above inequality is exact. 相似文献
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In this paper,we construct a function φ in L2(Cn,d Vα) which is unbounded on any neighborhood of each point in Cnsuch that Tφ is a trace class operator on the SegalBargmann space H2(Cn,d Vα).In addition,we also characterize the Schatten p-class Toeplitz operators with positive measure symbols on H2(Cn,d Vα). 相似文献
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证明了拟线性次椭圆方程组-X_α~*(a_(ij)~(αβ)(x,u)X_βu~j)=-X_α~*f_i~α+g_i,i=1,2,…,N,x∈Ω的弱解广义梯度Xu在Morrey空间L_x~(p,λ)(Ω,R~(mN))(p2)上的部分正则性,其中光滑实向量场族X=(X_1,X_2,…,X_m)满足H(o|¨)rmander有限秩条件,X_α~*是X_α的共轭;而且主项系数a_(ij)~(αβ)(x,u)关于x一致VMO(Vanishing Mean Oscillation的缩写,消失平均震荡)间断,且关于u为一致连续. 相似文献
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该文建立了关于单形宽度的杨路、张景中不等式的一个逆不等式. 作为凸体宽度不等式的应用,得到了凸体的截面和投影的一些估计式. 相似文献
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Let H1, H2 and H3 be infinite dimensional separable complex Hilbert spaces. We denote by M(D,V,F) a 3×3 upper triangular operator matrix acting on Hi +H2+ H3 of theform M(D,E,F)=(A D F 0 B F 0 0 C).For given A ∈ B(H1), B ∈ B(H2) and C ∈ B(H3), the sets ∪D,E,F^σp(M(D,E,F)),∪D,E,F ^σr(M(D,E,F)),∪D,E,F ^σc(M(D,E,F)) and ∪D,E,F σ(M(D,E,F)) are characterized, where D ∈ B(H2,H1), E ∈B(H3, H1), F ∈ B(H3,H2) and σ(·), σp(·), σr(·), σc(·) denote the spectrum, the point spectrum, the residual spectrum and the continuous spectrum, respectively. 相似文献
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Qi Guo 《Discrete and Computational Geometry》2005,34(2):351-362
Given a convex body $C\subset R^n$ (i.e., a compact convex set with nonempty
interior), for $x\in$ {\it int}$(C)$, the interior, and a hyperplane $H$ with $x\in H$,
let $H_1,H_2$ be the two support hyperplanes of $C$ parallel to $H$. Let $r(H, x)$
be the ratio, not less than 1, in which $H$ divides the distance between
$H_1,H_2$. Then the quantity
$${\it As}(C):=\inf_{x\in {\it int}(C)}\,\sup_{H\ni x}\,r(H,x)$$
is called the Minkowski measure of asymmetry of $C$. {\it As}$(\cdot)$ can be viewed as a real-valued function defined on the family of
all convex bodies in $R^n$. It has been known for a long time that {\it As}$(\cdot)$
attains its minimum value 1 at all centrally symmetric convex bodies and maximum
value $n$ at all simplexes. In this paper we discuss the stability of the
Minkowski measure of asymmetry for convex bodies. We give an estimate for the
deviation of a convex body from a simplex if the corresponding Minkowski measure
of asymmetry is close to its maximum value. More precisely, the following result
is obtained: Let $C\subset R^n$ be a convex body. If {\it As}$(C)\ge n-\varepsilon$ for some $0\le
\varepsilon < 1/8(n+1),$ then there exists a simplex $S_0$ formed by $n+1$
support hyperplanes of $C$, such that
$$(1+8(n+1)\varepsilon)^{-1}S_0\subset C\subset S_0,$$
where the homethety center is the (unique) Minkowski critical point of $C$. So
$$d_{{\rm BM}}(C,S)\le 1+8(n+1)\varepsilon$$
holds for all simplexes $S$, where $d_{{\rm BM}}(\cdot,\cdot)$ denotes the Banach-Mazur distance. 相似文献
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2×2阶上三角型算子矩阵的Moore-Penrose谱 总被引:2,自引:1,他引:1
设$H_{1}$和$H_{2}$是无穷维可分Hilbert空间. 用$M_{C}$表示$H_{1}\oplusH_{2}$上的2$\times$2阶上三角型算子矩阵$\left(\begin{array}{cc} A & C \\ 0 & B \\\end{array}\right)$. 对给定的算子$A\in{\mathcal{B}}(H_{1})$和$B\in{\mathcal{B}}(H_{2})$,描述了集合$\bigcap\limits_{C\in{\mathcal{B}}(H_{2},H_{1})}\!\!\!\sigma_{M}(M_{C})$与$\bigcup\limits_{C\in{\mathcal{B}}(H_{2},H_{1})}\!\!\!\sigma_{M}(M_{C})$,其中$\sigma_{M}(\cdot)$表示Moore-Penrose谱. 相似文献