THE L^2-BOUNDEDNESS OF PSEUDODIFFERENTIAL OPERATORS WITH NONSMOOTH COEFFICIENT SYMBOLS

1. Introduction In application of nonlinear boundary value problems, it is sometimes important to know that L~2-boundedness of a class of pseudo-differential operators with symbols whioh have nonsmooth coefficients. In [2], Coifman and Meyer proved that the operator σ(x, D) is bounded in L~2(R~n) if its symbold (x, ξ) satisfies:

Painlevé Analysis,Soliton Solutions and Bcklund Transformation for Extended (2 + 1)-Dimensional Konopelchenko-Dubrovsky Equations in Fluid Mechanics via Symbolic Computation

This paper is to investigate the extended(2+1)-dimensional Konopelchenko-Dubrovsky equations,which can be applied to describing certain phenomena in the stratified shear flow,the internal and shallow-water waves, plasmas and other fields.Painleve analysis is passed through via symbolic computation.Bilinear-form equations are constructed and soliton solutions are derived.Soliton solutions and interactions are illustrated.Bilinear-form Backlund transformation and a type of solutions are obtained.

2*2MIMO系统模型搭建及误码率分析

针对普通单天线收发系统无法满足现有互联网通信容量日益增大的问题,提出了一种多天线技术MIMO(Multiple Input Multiple Output)。首先搭建了2*2MIMO通信系统,其中发送端包括QPSK映射模块和Alamouti编码模块,信道为瑞利衰落信道,接收端包括最大比合并模块;然后对所设计的系统用Matlab软件进行了仿真;最后通过仿真对2*2MIMO系统的误码率性能进行了分析。仿真结果表明,2*2MIMO系统比2*1MIMO系统在相同信噪比的情况下误符号率性能更好,证实了2*2MIMO系统可增大信道的容量并提高系统的可靠性。

基于MATLAB/Simulink的2ASK传输系统设计与分析

基于MATLAB/Simulink仿真软件,根据通信系统调制与解调原理完成2ASK传输系统设计,对系统进行测试验证,观察发现系统各点波形与理论分析一致,噪声较小时能够实现无误码传输,分析发现随着噪声的增大误码率也逐渐增大,表明系统设计合理有效.2ASK传输系统设计对相关研究和系统改善有一定借鉴意义,同时也为系统设计以及实验教学提供一种新方法.

具混沌性状的符号动力系统模2映射

本文利用模运算，定义了符合动力系统模２映射，并证明该映射具混沌性状。

G_3n^n(Q)(n≥3)不是K_2Q的子群

设Φn(x) 是 n 次分圆多项式,记 Gn(F) = {{x,Φn(x)} ∈ K2F x,Φn(x) ∈F*},其中F是域.证明了当n≥3时,G3n (Q)不是K2 Q的子群,从而部分地证实了Browkin 的一个猜想.

基于2-邻域局部结构的矢量图符号模糊识别方法

针对矢量图纸中经常出现的符号模糊性进行分类定义,提出一种基于2-邻域局部结构的符号识别方法.该方法利用局部结构的思想,首先将原型符号和目标图纸统一表示成2-邻域局部结构的集合,并定义2-邻域局部结构的相似距离;进而根据距离度量筛选出相似的局部结构;最后对目标图纸中的相似局部结构按照空间距离和缩放因子进行聚类,获得与原型符号相似的符号实例.实验结果表明,文中方法不仅可以解决包含重复结构、可伸缩等模糊性的符号识别问题,还能够保持较高的识别准确率.

一个(2+1)维Boussinesq方程的怪波解

以含有5个任意常数的扩展(2+1)维Boussinesq方程为研究对象,利用符号计算方法求得该扩展(2+1)维Boussinesq方程的一阶和二阶怪波解。

tan(φ(ξ)/2)-展开法和立方非线性Schrödinger方程精确解

利用tan(φ(ξ)/2)-展开方法,并借助符号计算系统-Maple,构造了立方非线性Schrödinger方程的多种精确解,其中包括一些新的结果.同时,说明此方法构造非线性偏微分方程精确解非常有效.

基于2倍过采样的TDS-OFDM定时恢复算法

提出了一种基于2倍过采样的TDS-OFDM定时恢复算法,与基于4倍过采样的算法相比,降低了接收机的工作频率和复杂度。在多种信道下的仿真结果表明,提出的算法与基于4倍过采样的算法性能相当,可直接应用于TDS-OFDM系统中。本算法已成功应用于电力线通信系统中,实现了在20 MHz带宽的电力线信道上传输上百兆的数据率。

Neither G_9(Q) nor G_(11)(Q) Is a Subgroup of K_2(Q)

It is proved that neither G9(Q) nor G11(Q) is a subgroup of K2(Q)which confirms two special cases of a conjecture proposed by Browkin, J. (LectureNotes in Math., 966, Springer-Verlag, New York, Heidelberg, Berlin, 1982, 1-6).

(2+1)维Boiti-Leon-Pempinelli方程的精确解

介绍了求解非线性偏微分方程的方法—(G′/G)-展开法。通过使用该方法,并借助Maple得到了(2+1)维Boiti-Leon-Pempinelli(简称BLP)方程的多种新精确解,其中包括双曲函数解、三角函数解和有理函数解等。

A Series of Exact Solutions for a New （2＋1）-Dimensional Calogero KdV Equation

An algebraic method is proposed to solve a new (2+1)-dimensional Calogero KdV equation and explicitly construct a series of exact solutions including rational solutions, triangular solutions, exponential solution, line soliton solutions, and doubly periodic wave solutions.

New Families of Rational Form Variable Separation Solutions to(2+1)-Dimensional Dispersive Long Wave Equations

With the aid of symbolic computation system Maple, some families of new rational variable separation solutions of the （2＋1）-dimensional dispersive long wave equations are constructed by means of a function transformation, improved mapping approach, and variable separation approach, among which there are rational solitary wave solutions, periodic wave solutions and rational wave solutions.

New Families of Rational Form Solitary Wave Solutions to （2＋1）-Dimensional Broer-Kaup-Kupershmidt System＊

Taking the (2+1)-dimensional Broer-Kaup-Kupershmidt system as a simple example, some families of rational form solitary wave solutions, triangular periodic wave solutions, and rational wave solutions are constructed by using the Riccati equation rational expansion method presented by us. The method can also be applied to solve more nonlinear partial differential equation or equations.

对K_(2)(Z_(4)C_(2^(r)))结构的估计

由张亚坤和唐国平2018年的论文(张亚坤,唐国平.一类特殊有限群环的K_(2)-群,中国科学院大学学报)得K_(2)(Z_(4)C_(2))=(C_(2))^(2),K_(2)(Z_(4)C_(4))=(C_(2))^(3)。借助相对K_(2)群,通过计算Dennis-Stein符号给出K_(2)(Z_(4)C_(2~r))的一组简化的生成元,在此基础上给出K_(2)(Z_(4)C_(2))和K_(2)(Z_(4)C_(4))的基底,并得到K_(2)(Z_(4)C_(8))=(C_(2))^(k),3≤k≤5,K_(2)(Z_(4)C_(2^(r)))=(C_(2))^(l),l≤2^(r-1)+1。

tan(φ(ξ)/2)-展开法和(2+1)维非线性立方Klein-Gordon方程

运用tan(φ(ξ)/2)-展开法并借助符合计算系统Maple,求出了(2+1)维非线性立方Klein-Gordon方程的多种精确解,这些解包括周期解、孤子解、指数函数解。

Coulomb Interaction in H2 Molecule for States beyond the Ground State

The focus of our investigation is to evaluate one of the four contributing terms to the coulombic potential energy of an H2 molecule. Specifically, we are interested in the term describing the electronic interaction of the charge distribution of one of the hydrogen atoms with the proton of the second atom. Quantum mechanics provides the charge distribution;hence, the evaluation of this term is a semi-classic quantum physics issue. For states other than the ground state the charge distributions are not spherically symmetric;they are functions of the radial and the angular coordinates. For the excited states we develop exact analytic expressions conducive to the potential energies. Because of the functional complexities of the wave functions, the evaluation of the core integrals is carried out utilizing symbolic capabilities of Mathematica [1]. Plots of these energies vs. the distance between the two protons reveal global features.

Symbol与神州数码联手推动“企业移动”

4月中旬，美国Symbol公司与神州数码宣布合作，共同推动Symbol“企业移动”解决方案在国内的应用。

作战仿真中通用二维态势显示系统研究

某通用二维态势显示系统,其功能模块包括:军标模块、FOM信息提取、态势信息配置、态势数据采集、态势数据解析及地理信息模块。整个态势显示系统基于Visual C++设计实现,采用KD-RTI作为运行支撑环境,并利用MapX组件实现地图显示及军标标绘。