(2+1)维广义Nizhnik-Novikov-Veselov系统的新严格解和复合波激发

利用拓展的Riccati方程映射法与变量分离法，得到了(2+1)维广义Nizhnik-Novikov-Veselov(GNNV)系统新的含有两个任意函数的相当广义的变量分离严格解.根据其中的周期波解，找到了该系统的复合波，即在周期波背景下的孤立波，并简要讨论了其演化行为. 关键词： GNNV系统 拓展Riccati映射 周期波解 孤立波     

A general mapping approach and new travelling wave solutions to the general variable coefficient KdV equation

A general mapping deformation method is applied to a generalized variable coefficient KdV equation. Many new types of exact solutions, including solitary wave solutions, periodic wave solutions, Jacobian and Weierstrass doubly periodic wave solutions and other exact excitations are obtained by the use of a simple algebraic transformation relation between the generalized variable coefficient KdV equation and a generalized cubic nonlinear Klein－Gordon equation.     

Fractal localized structures related to Jacobian elliptic functions in the higher-order Broer－Kaup system

This work reveals a novel phenomenon—that the localized coherent structures of a (2﹢1)﹣dimensional physical model possesses fractal behaviours. To clarify the interesting phenomenon, we take the (2﹢1)﹣dimensional higher-order Broer－Kaup system as a concrete example. Starting from a B?cklund transformation, we obtain a linear equation, and then a general solution of the system is derived. From this some special localized excitations with fractal behaviours are obtained by introducing some types of lower-dimensional fractal patterns that related to Jacobian elliptic functions.     

Boiti-Leon-Pempinelli系统的新变量分离解及其方形孤子和分形孤子

利用拓展的Riccati方程映射法，得到了(2+1)维Boiti-Leon-Pempinelli系统新的变量分离 解．根据得到的分离变量解，构造出该系统新型的孤子结构——方孤子和分形孤子． 关键词： Boiti-Leon-Pempinelli系统 拓展Riccati映射 方形孤子 分形孤子     

Kdv－Burgers方程和Schroeding－KdV耦合方程的显式行波解

提出了一种基于形变映射理论的构造非线性方程行波解的方法，并用该方法求得了非线性Kdv-Burgers方程和耦合Schroeding-KdV方程的行波解。这种方法不仅找到了先前用其他复杂方法求得的若干精确解，而且在有的情况下还可找到新的解或更为一般形式的精确解。     

仪器设备资产评估研究

提出了仪器设备静态资产和动态资产概念,通过引入仪器设备折旧系数,延伸了仪器设备资产的静态价值含义。基于高校实验仪器设备资产不具备市场交易属性的前提,建立了仪器设备静态资产和动态资产评估模型,分析了仪器设备资产价值与高校人才培养、科研活动、经费投入及管理模式等各因素的关联影响,介绍了资产评估的方法及途径。     

Exact solutions and localized excitations of (3+1)-dimensional Gross—Pitaevskii system

Periodic wave solutions and solitary wave solutions to a generalized (3+1)-dimensional Gross--Pitaevskii equation with time-modulated dispersion, nonlinearity, and potential are derived in terms of an improved homogeneous balance principle and a mapping approach. These exact solutions exist under certain conditions via imposing suitable constraints on the functions describing dispersion, nonlinearity, and potential. The dynamics of the derived solutions can be manipulated by prescribing specific time-modulated dispersions, nonlinearities, and potentials. The results show that the periodic waves and solitary waves with novel behaviors are similar to similaritons reported in other nonlinear systems.     

Exact projective solutions of generalized nonlinear Schrödinger system with variable parameters

A direct self-similarity mapping approach is successfully applied to a generalized nonlinear Schrödinger (NLS) system. Based on the known exact solutions of a self-similarity mapping equation, a few types of significant localized excitation with novel properties are obtained by selecting appropriate system parameters. The integrable constraint condition for the generalized NLS system derived naturally here is consistent with the known compatibility condition generated via the Painlev? analysis.     

基于距离判别的心电身份识别技术研究

针对传统生物特征身份识别技术易于破解的弊端,提出了心电信号身份识别技术。分析了心电信号身份识别的距离判别法则。结合马氏距离、小波距离、谱能量距离和相关距离算法,提出加权系数智能匹配算法。下位机利用双电极法采集心电信号,经串口送往上位机。Matlab软件平台下,编程实现心电信号数字处理和身份识别。通过对40个人的心电样本进行测试,获得了95%的识别结果。