关于广义Sublaplacian算子特征函数的展开

本文研究了广义Ｓｕｂｌａｐｌａｃｉａｎ算子特征函数的展开．通过定义广义　－扭曲卷积，我们得到相应的Ｐｌａｎｃｈｅｒｅｌ定理及Ｈａｕｓｄｏｒｆｆ－Ｙｏｕｎｇ不等式，最后，我们还给出了当广义Ｓｕｂｌａｐｌａｃｉａｎ算子的特征值为离散时的一些结果．     

SL(2,R)上的Fourier变换的渐近性质的注记

该文借助于犛犔（２，犚）上李代数及其万有包络代数讨论了犛犔（２，犚）上函数的Ｆｏｕｒｉｅｒ变换在无穷远处下降的阶与函数的光滑性的关系，我们得到的结论较［６］中的结论好，并由此得到犆２犮（犌）中的Ｐｌａｎｃｈｅｒｅｌ定理．     

关于SL(2,R)上速降函数的反演公式

在局部紧可分群的一般理论中，分解正则表示以及获得反演公式（或 Ｐｌａｎ－ｃｈｅｒｅｌ定理的明确表示）是调和分析的基本目标之一．ＳＬ（２，　）是最简单的非交换局部紧么模半单Ｌｉｅ群．Ｈａｒｉｓｈ－Ｃｈａｎｄｒａ在 Ｃ∞ｃ（ＳＬ（２，　））上获得了反演公式，Ｘｉａｏ和ｈｅｎｇ在文［１］中证明了Ｃ３ｃ（ＳＬ（２， ）上的反演公式．在文［２］中Ｚｈｅｎｇ引入了Ｌｉｅ群Ｇ上函数的广义微分（Ａ导数）概念．在本文中，我们利用文［２］中的微分概念来研究ＳＬ（２，　）上可微函数的Ｆｏｕｒｉｅｒ变换的阶，并获得了ＳＬ（２，　）上速降函数的反演公式．     

余切公式及其应用

在△ＡＢＣ中 ,记内角Ａ ,Ｂ ,Ｃ的对边为ａ ,ｂ ,ｃ,Ｓ为△ＡＢＣ的面积 ,由余弦定理可得 :ｃｔｇＡ =ｂ2 ｃ2 -ａ24Ｓ ,ｃｔｇＢ =ｃ2 ａ2 -ｂ24Ｓ ,ｃｔｇＣ =ａ2 ｂ2 -ｃ24Ｓ .我们称这组公式为“余切公式” .“余切公式”在形式上有与余弦定理相媲美的对称美 ,且在解决三角形中与内角的正 (余 )切有关的命题时 ,能起到化繁为简 ,化难为易之功效 ,请看如下例题 .例 1　 ( 1 999全国高中数学联赛试题 )在△ＡＢＣ中 ,记ＢＣ =ａ ,ＣＡ =ｂ ,ＡＢ =ｃ ,若9ａ2 9ｂ2 - 1 9ｃ2 =0　则ｃｔｇＣｃｔｇＡ ｃｔｇＢ=.解　由余切公式得 :ｃ…     

Dirichlet L-函数倒数的2k次加权均值

本文主要目的是利用经典的Ｋｌｏｏｓｔｅｒｍａｎｎ和估计及其解析方法研究Ｄｉｒｉｃｈ－ｌｅｔ Ｌ-函数倒数的 ２ｋ次加权均值,得到了一个较为精确的渐近公式．     

线性流形上矩阵方程B^TXB=D的加权最小二乘对称解和解的最佳逼近

本文利用矩阵的奇异值分解（SVD）,给出了在一流形上矩阵方程B^TXB=D的加权最小二乘对称解的通解表达式,并解决了加权最小二乘对称解的最佳逼近问题。     

二元奇偶函数在对称区域上的积分公式及其证明

将一元奇偶函数及其在对称区间上的积分公式进行了推广,得到了二元奇偶函数在对称区域上的定义及其积分公式,并给出了积分公式的证明,以简化某些积分的计算.     

对称Sobolev函数到加权函数空间的嵌入

证明Sobolev空间W^(1,p)(R(1,p)(Rⁿ)上对称函数到某类加权Ln)上对称函数到某类加权L^p空间存在紧嵌入定理,进而,作为应用,证明在一定条件下,一类非线性项涉临界Sobolev指标的拟线性椭圆方程具有有限能量解的正解.     

关于浅海中简正波衰减与群速的讨论

详细地讨论了浅海简正波衰减与群速的计算问题,并提出了一种新的计算简正波衰减与群速的修正加权权分公式.在 Pekeris浅海情况下,比较了该公式与循环距离公式、加权积分公式的计算精度和适用范围,并研究了上述3种公式对浅海声传播计算的影响.理论分析与数值结果表明,修正加权积分公式比国际上流行的加权积分公式有更高的精度,可广泛应用于浅海声场的计算.     

d维Bernstein算子加Jacobi权的收敛阶

１．引 言 设Ｓ＝Ｓｄ（ｄ＝１,２,…）是 Ｒｄ中的单纯形,即记ｋ＝（ｋ１,ｋ２,……,ｋｄ）∈Ｒｄ,ｋｉ为非负整数, ,则Ｓ上定义的函数ｆ所对应的ｄ维Ｂｅｒｎｓｔｅｉｎ算子定义为其中 Ｐｎ,ｋ（ｘ）＝是 Ｂｅｒｎｓｔｅｉｎ基函数．引进多维Ｊａｃｏｂｉ权函数, 这里 ．定义Ｂｅｒｎｓｔｅｉｎ权函数 表示微分算子． 记 是单位向量,即第ｉ个分量为１,其余ｄ－１个分量为０, ．定义函数ｆ在方向ｅ上的ｒ阶对称差分为Ｃ（Ｓ）中的加权Ｓｏｂｏｌｅｖ空间为其中Ｓ为Ｓ的内部．定义加权Ｋ－泛函及加权光滑模其中 为加权范数． …     

Connection between the Plancherel formula and the Howe dual pair ()

Let D be the bounded symmetric domain In this article, we describe explicitly the Plancherel formula of a weighted Bergman space on under the action of by using the Howe dual pair Received: 13 November 2000; in final form: 30 January 2002 / Published online: 6 August 2002     

The Plancherel decomposition for a reductive symmetric space. I. Spherical functions

We prove the Plancherel formula for spherical Schwartz functions on a reductive symmetric space. Our starting point is an inversion formula for spherical smooth compactly supported functions. The latter formula was earlier obtained from the most continuous part of the Plancherel formula by means of a residue calculus. In the course of the present paper we also obtain new proofs of the uniform tempered estimates for normalized Eisenstein integrals and of the Maass–Selberg relations satisfied by the associated C-functions.     

The Plancherel decomposition for a reductive symmetric space. II. Representation theory

We obtain the Plancherel decomposition for a reductive symmetric space in the sense of representation theory. Our starting point is the Plancherel formula for spherical Schwartz functions, obtained in part I. The formula for Schwartz functions involves Eisenstein integrals obtained by a residual calculus. In the present paper we identify these integrals as matrix coefficients of the generalized principal series.     

Berezin Forms on Line Bundles over Complex Hyperbolic Spaces

We consider complex hyperbolic spaces where and , line bundles , over them and representations of in smooth sections of (the representation is induced by a character of ). We define a Berezin form $, associated with , and give an explicit decomposition of this form into invariant Hermitian (sesqui-linear) forms for irreducible representations of the group for all and . It is the main result of the paper. Besides it, we give the Plancherel formula for . As it turns out, this formula is, en essence, one of the particular cases of the Plancherel formula for the quasiregular representation for rank one semisimple symmetric spaces, see [20], it can be obtained from the quasiregular Plancherel formula for hyperbolic spaces (complex, quaternion, octonion) by analytic continuation in the dimension of the root subspaces. The decomposition of the Berezin form allows us to define and study the Berezin transform, - in particular, to find out an explicit expression of this transform in terms of the Laplacian. Using that, we establish the correspondence principle (an asymptotic expansion as ). At last, considering , we observe an interpolation in the spirit of Neretin between Plancherel formulae for and for the similar representation for a compact form of the space . Submitted: July 12, 2001?Revised: February 12, 2002     

A Restriction Theorem on the Reduced Product Heisenberg Group

§１．　ＩｎｔｒｏｄｕｃｔｉｏｎＬｅｔΩｂｅａｒｅｇｕｌａｒｃｏｎｅｉｎＲｎ,Φ：Ｃｍ×Ｃｍ→Ｃｎ＝Ｒｎ＋ｉＲｎａｎΩ－ｐｏｓｉｔｉｖｅＨｅｒｍｉｔｉａｎｍａｐ．ＴｈｅＳｉｅｇｅｌｄｏｍａｉｎＤΩ,ΦｏｆｔｙｐｅｔｗｏｉｎＣｎ×ＣｍｉｓｄｅｆｉｎｅｄｂｙＤΩ,Φ＝｛（ｚ,ｗ）∈：Ｃｎ×Ｃｍ：Ｉｍｚ－Φ（ｗ,ｗ）∈Ω｝（１）（ｓｅｅ［６］）．Ｓｐｅｃｉａｌｌｙ,ｗｅａｓｓｕｍｅｔｈａｔｎ＝ｍ,Ω＝｛ｔ＝（ｔ１,ｔ２,…,ｔｎ）∈Ｒｎ：ｔｉ＞０,ｉ＝１,２,…,ｎ｝,Φ（ｕ,ｖ）＝ｕ·ｖ＝（ｕ１ｕ…     

Operator-Valued Continuous Gabor Transforms over Non-unimodular Locally Compact Groups

In this article, we present the abstract harmonic analysis aspects of the operator-valued continuous Gabor transform (CGT) on second countable, non-unimodular, and type I locally compact groups. We show that the operator-valued continuous Gabor transform CGT satisfies a Plancherel formula and an inversion formula. As an example, we study these results on the continuous affine group.     

A Plancherel formula for the isotropic cone

In this short note we propose a definition of the isotropic cone related to a semisimple symmetric space and derive a Plancherel formula for this cone.     

La formule de Plancherel pour les groupes de Lie presque algébriques réels

We give a proof of the Plancherel formula for real almost algebraic groups in the philosophy of the orbit method, following the lines of the one given by M. Duflo and M. Vergne for simply connected semisimple Lie groups. Main ingredients are: (1) Harish-Chandra's descent method which, interpreting Plancherel formula as an equality of semi-invariant generalized functions, allows one to reduce it to a neighbourhood of zero in the Lie algebra of the centralizer of any elliptic element; (2) character formula for representations constructed by M. Duflo, we recently proved; (3) Poisson-Plancherel formula near elliptic elements s in good position, a generalization of the classical Poisson summation formula expressing the Fourier transform of the sum of a series of Harish-Chandra type elliptic orbital integrals in the Lie algebra centralizing s as a generalized function supported on a set of admissible regular forms in the dual of this Lie algebra.     

On the regular representation of a nonunimodular locally compact group

We study the discrete part of the regular representation of a locally compact group and also its Type I part if the group is separable. Our results extend to nonunimodular groups' known results for unimodular groups about formal degrees of square integrable representations, and the Plancherel formula. We establish orthogonality relations for matrix coefficients of square integrable representations and we show that the formal degree in general is not a positive number, but a positive self-adjoint unbounded operator, semi-invariant under the representation. Integrable representations are also studied in this context. Finally we show that when the group is nonunimodular, “Plancherel measure” is not a true measure, but a measure multiplied by a section of a certain real oriented line bundle on the dual space of the group.     

THE FOURIER TRANSFORM FOR HOMOGENEOUS VECTOR BUNDLES OVER QUATERNION UNIT DISK

61. IntroductionLet G be a connected noncompart semisimple Lie group with finite center and K amaimal compact subgroup of G, and X = G/K the associated Riemannian symmetricspace of noncompact type.Let (Vr, f) be an irreducible unitary representation of K, and E' be the homogeneousvector bundle over G/K associated with the given representation f. It is well krmwn that across section j 6 F(E") mad be identified with a vector-vained function f: G - V. whichi. right-K-cowiaat of type TI i.…