S~5上仿Blaschke张量的特征值为常数的超曲面

设x:M→S~(n+1)是(n+1)-维单位球面上不含脐点的超曲面,在S~(n+1)的Moebius变换群下浸入x的四个基本不变量是:一个黎曼度量g称为Moebius度量;一个1-形式Φ称为Moebius形式;一个对称的(0,2)张量A称为Blaschke张量和一个对称的(0,2)张量B称为Moebius第二基本形式.对称的(0,2)张量D=A+λB也是Moebius不变量,其中λ是常数,D称为浸入x的仿Blaschke张量.李海中和王长平研究了满足条件:(i)Φ=0;(ii)A+λB+μg=0的超曲面,其中λ和μ都是函数,他们证明了λ和μ都是常数,并且给出了这类超曲面的分类,也就是在Φ=0的条件下D只有一个互异的特征值的超曲面的分类.本文对S~5上满足如下条件的超曲面进行了完全分类:(i)Φ=0,(ii)对某常数λ,D具有常数特征值.     

Blaschke张量的行列式为常数的2维子流形的研究

本文研究了S^(2+p)中2维子流形的莫比乌斯刚性问题.设M^(2)是^(2+p)维单位球S^(2+p)中的无脐子流形,M^(2)在S^(2+p)的莫比乌斯变换群下的四个莫比乌斯基本量为莫比乌斯度量g,Blaschke张量A,莫比乌斯形式Φ以及莫比乌斯第二基本形式B,利用不等式估计,证明了下列刚性定理:设x:M^(2)→S^(2+p)是^(2+p)维单位球S^(2+p)中莫比乌斯形式消失的2维紧致子流形,Blaschke张量A的行列式Det A=c(const)>0,若tr A≥1/4,那么x(M^(2))莫比乌斯等价于S^(2+p)中常曲率极小子流形或者S^(3)(1/√1+c^(2))中环面S^(1)(r)×S^(1)(√1/1+c^(2)-r^(2)),其中r^(2)=2-√1-64c/4(1+c^(2)).本文的证明补充了文献[3]中2维子流形情形.     

Hardy空间上某些解析Toeplitz算子的换位及约化子空间

讨论了Hardy空间上以非退化有界单叶解析函数的幂为符号的解析Toeplitz算子的换位.并且刻划了符号为三个Blaschke因子积的解析Toeplitz算子的约化子空间.     

单位球面上具有非负M bius截面曲率的超曲面

Let x:M→S~(n 1)be a hypersurface in the (n 1)-dimensional unit sphere S~(n 1)without umbilic point. The M(?)bius invariants of x under the M(?)bius transformation group of S~(n 1) are M(?)bius metric,M(?)bius form,M(?)bius second fundamental form and Blaschke tensor.In this paper,we prove the following theorem: Let x:M→S~(n 1)(n＞2)be an umbilic free hypersurface in S~(n 1) with nonnegative M(?)bius sectional curvature and with vanishing M(?)bius form.Then x is locally M(?)bius equivalent to one of the following hypersurfaces:(i)the torus S~k(a)×S~(n-k)((1-a~2)~(1/2))with 1≤k≤n-1;(ii)the pre-image of the stereographic projection of the standard cylinder S~k×R~(n-k)(?)R~(n 1) with 1≤k≤n-1;(iii)the pre-image of the stereographic projection of the cone in R~(n 1):(?)(u,v,t)=(tu,tv), where(u,v,t)∈S~k(a)×S~(n-k-1)((1-a~2)~(1/2))×R~ .     

Integral logarithmic means of Blaschke products

Using the Fourier series method, we generalize results characterizing the behavior of the integral logarithmic means of Blaschke products of arbitrary order for meromorphic functions.Translated fromMatematicheskie Zametki, Vol. 64, No. 2, pp. 199–206, August, 1998.     

Hilbert transform of

There are two general ways to evaluate the Hilbert transform of a function of real variable . We can extend to a harmonic function in the upper half plane by the Poisson integral formula. Non-tangential limit of its harmonic conjugate exists almost everywhere and is defined to be the Hilbert transform of . There is also a singular integral formula for the Hilbert transform of . It is fairly difficult to directly evaluate the Hilbert transform of . In this paper we give an explicit formula for the Hilbert transform of , where is a function in the Cartwright class.

     

Cyclic AFD algorithm for the best rational approximation

We propose a practical algorithm of best rational approximation of a given order to a function in the Hardy H² space on the unit circle and on the real line. The type of approximation is proved to be equivalent with Blaschke form approximation. The algorithm is called Cyclic adaptive Fourier decomposition as it adaptively selects one parameter for each cycle on the basis of the maximal selection principle proved in the literature of adaptive Fourier decomposition. Copyright © 2013 John Wiley & Sons, Ltd.     

单位球面上的子流形有关截曲率的Pinching定理

设M是单位球面上不含脐点的子流形,Moebius形式Φ消失,本文讨论M 关于Mobius度量的截曲率的Pinching问题.     

Sn+1中M(o)ebius形式平行的超曲面

如果x:M→Sn+1是不含脐点的超曲面,且M的Moebius形式 =0和Blaschke张量A=λg,就称M为Moebius迷向超曲面,如果x:M→Sn+1 是不合脐点的超曲面,且M的Moebius形式 平行( =0)和Blaschke张量A=λg,就称M为Moebius拟迷向超曲面,这里g是M上的Moebius度量,λ:M→R是M上的光滑函数,本文证明了如下结果: (1)设x:M→Sn+1(n 3)是不含脐点的超曲面,则M是拟迷向超曲面当且仅当M是迷向超曲面,(2)设x:M→Sn+1(n 3)是不合脐点的超曲面,且M的Moebius形式 平行和Blaschke张量A也平行( A=0),则 =0.     

Consecutive minimum phase expansion of physically realizable signals with applications

In digital signal processing, it is a well know fact that a causal signal of finite energy is front loaded if and only if the corresponding analytic signal, or the physically realizable signal, is a minimum phase signal, or an outer function in the complex analysis terminology. Based on this fact, a series expansion method, called unwinding adaptive Fourier decomposition (AFD), to give rise to positive frequency representations with rapid convergence was proposed several years ago. It appears to be a promising positive frequency representation with great potential of applications. The corresponding algorithm, however, is complicated due to consecutive extractions of outer functions involving computation of Hilbert transforms. This paper is to propose a practical algorithm for unwinding AFD that does not depend on computation of Hilbert transform, but, instead, factorizes out the Blaschke product type of inner functions. The proposed method significantly improves applicability of unwinding AFD. As an application, we give the associated Dirac‐type time‐frequency distribution of physically realizable signals. Copyright © 2015 John Wiley & Sons, Ltd.