雷诺校正法在煤发热量测定中的应用

介绍雷诺校正法计算煤发热量的原理、算法及应用.方法应用于燃煤发热量计算,结果表明,用雷诺校正法处理煤发热量测定时,其结果优于瑞方公式法和奔特公式法,与国标法相比,分析误差在规定范围内.在文中列出了雷诺校正法处理煤发热量的实用Matlab源程序.     

求解物理极值——MATLAB软件在物理教学中的应用之二

中学物理极值问题的求解有多种方法.应用MATLAB软件,可以快捷地运用求导法或者图像法求解极值问题.两者相辅相成,可以提高对物理问题的理解水平.在图像法中,提供了三变量作图法求极值的案例.     

耦合FE/WB法在声分析中的应用

简要描叙FE法(finite element method)和WB法(wave based method)的理论背景以及耦合FE/WB法的数学基础.耦合FE/WB法利用两者的优势——FE法的广泛应用和WB法的高收敛特性,将FE模型中较大且几何简单的部分采用WB法代替.耦合模型具有相对较少的自由度.对于较高的频率还可以进行细分得到更高的计算精度,并利用模态缩减法进一步减少自由度数.数值算例结果表明,该耦合方法有潜力覆盖中频段的声分析.     

时间平均全息法显示超声场

本文介绍了用时间平均全息法显示超声振幅场侧视图的一种有效方法.由时间平均全息法获得的全息图再现象,与Schlieren法的零级光所成的象完全相同.本方法与常用的Schlieren法比较,有两个优点:1.不需要质量较高的光学元件,2.能显示频率较低的超声场.当然,本方法也有不如Schlic-ren法之处.     

弹性力学的复变量重构核粒子法

在重构核粒子法的基础上,提出了复变量重构核粒子法.复变量重构核粒子法的优点是采用一维基函数建立二维问题的修正函数.然后,将复变量重构核粒子法应用于弹性力学,提出了弹性力学的复变量重构核粒子法,并推导了相关公式.与传统的重构核粒子法相比,复变量重构核粒子法具有计算量小、效率高的优点.最后给出了数值算例证明了该方法的有效性. 关键词： 重构核粒子法 复变量重构核粒子法 弹性力学 无网格方法     

物理研究方法在初中教材中的实施和运用

物理研究方法是过程与方法中的基本要素,是能力培养的具体要求.掌握研究方法是从物理到生活的深化,是学生可持续发展的源动力.初中物理研究方法主要有控制变量法、转换法、累积放大法、理想模型法、科学推理法、类比法、比较法、比值定义法、逆向思维法等九种方法.各种方法在教材中的实施与运用,是教学过程中的重点目标.     

“0.618”法、Fibonacci法、抛物线法搜寻复摆周期极值点

在实验室条件下,用"0.618"法、Fibonacci法和抛物线法来搜寻钟摆复摆周期极值点位置.通过实验发现,Fibonacci法在搜索精度上比"0.618"法高,但在搜寻速度上不占优势,而抛物线法在搜寻速度和精度上比"0.618"法和Fibonacci法都好.     

混合态数据库的Grover算法数学形式及其搜索成功率

Grover提出了容量为N的数据库量子搜索法.只需进行O(平方根N)次迭代就能以几乎为1的概率实现对目标的搜索.本文将文献[1]的Grover搜索法推广到混合态情形,给出了一个基于混合态的Grover搜索法,并分析了该搜索法成功的概率上界.进一步发现搜索法成功的概率完全依赖于所使用的初态(混合态).该结论为了解量子噪声对Grover搜索法的影响提供一定的理论依据.最后通过例子说明了如何实施基于混合态的Grover搜索法.     

多传感器光电系统视轴一致性测试方法研究

本文详细介绍了宽光谱的多传感器光电瞄准跟踪系统的视轴一致性测试的三种方法：像纸法、CCD 法和靶标法,详细分析了各种测试方法的主要误差来源.通过搭建一定的试验环境,分别用像纸法、CCD 法和靶标法对同一多传感器光电系统的视轴一致性进行了测试和分析.研究结果表明,CCD 法测试视轴一致性能达到了较高的准确度.     

蒙特卡洛模拟漫辐射时两种确定表面发射方向方法的比较

介绍一种有效的确定能束发射方向的方法——切球法.分析传统方法和切球法确定发射方向的原理及实施过程,说明切球法更为方便.采用2种方法对一简单的几何模型的角系数进行蒙特卡洛计算,所得结果与文献中积分结果进行比较,说明了切球法的可行性,计算精度能满足工程要求.同时对2种方法的计算耗时进行比较,切球法可以节省计算时间.将切球法应用到复杂系统中其优越性将会得到更加充分体现.     

Application of the energy balance method to nonlinear vibrating equations

In this paper, He’s energy balance method is applied to nonlinear vibrations and oscillations. The method is applied to four nonlinear differential equations. It has indicated that by utilizing He’s energy balance method (HEBM), just one iteration leads us to high accuracy of solutions. It has illustrated that the energy balance methodology is very effective and convenient and does not require linearization or small perturbation. Contrary to the conventional methods, in energy balance method, only one iteration leads to high accuracy of the solutions. The results reveal that the energy balance method is very effective and simple. It is predicted that the energy balance method can be found wide application in engineering problems, as indicated in following examples.     

Solutions of the nonlocal(2+1)-D breaking solitons hierarchy and the negative order AKNS hierarchy

The(2+1)-dimensional nonlocal breaking solitons AKNS hierarchy and the nonlocal negative order AKNS hierarchy are presented.Solutions in double Wronskian form of these two hierarchies are derived by means of a reduction technique from those of the unreduced hierarchies.The advantage of our method is that we start from the known solutions of the unreduced bilinear equations,and obtain solitons and multiple-pole solutions for the variety of classical and nonlocal reductions.Dynamical behaviors of some obtained solutions are illustrated.It is remarkable that for some real nonlocal equations,amplitudes of solutions are related to the independent variables that are reversed in the real nonlocal reductions.     

Intertwining technique for the one-dimensional stationary Dirac equation

The technique of differential intertwining operators (or Darboux transformation operators) is systematically applied to the one-dimensional Dirac equation. The following aspects are investigated: factorization of a polynomial of Dirac Hamiltonians, quadratic supersymmetry, closed extension of transformation operators, chains of transformations, and finally particular cases of pseudoscalar and scalar potentials. The method is widely illustrated by numerous examples.     

Exact Solutions for Fractional Differential-Difference Equations by an Extended Riccati Sub-ODE Method

In this paper, an extended Riccati sub-ODE method is proposed to establish new exact solutions for fractional differential-difference equations in the sense of modified Riemann-Liouville derivative. By a fractional complex transformation, a given fractional differential-difference equation can be turned into another differential-difference equation of integer order. The validity of the method is illustrated by applying it to solve the fractional Hybrid lattice equation and the fractional relativistic Toda lattice system. As a result, some new exact solutions including hyperbolic function solutions, trigonometric function solutions and rational solutions are established.     

A Moving Pseudo-Boundary MFS for Three-Dimensional Void Detection

We propose a new moving pseudo-boundary method of fundamental solutions (MFS) for the determination of the boundary of a three-dimensional void (rigid inclusion or cavity) within a conducting homogeneous host medium from overdetermined Cauchy data on the accessible exterior boundary. The algorithm for imaging the interior of the medium also makes use of radial spherical parametrization of the unknown star-shaped void and its centre in three dimensions. We also include the contraction and dilation factors in selecting the fictitious surfaces where the MFS sources are to be positioned in the set of unknowns in the resulting regularized nonlinear least-squares minimization. The feasibility of this new method is illustrated in several numerical examples.     

New periodic wave solutions via Exp-function method

The Exp-function method with the aid of symbolic computational system is used to obtain the generalized solitary solutions and periodic solutions for nonlinear evolution equations arising in mathematical physics, namely, nonlinear partial differential (BBMB) equation, generalized RLW equation and generalized shallow water wave equation. It is shown that the Exp-function method, with the help of symbolic computation, provides a powerful mathematical tool for solving other nonlinear evolution equations arising in mathematical physics.     

Pseudo-Hermitian Reduction of a Generalized Heisenberg Ferromagnet Equation. II. Special Solutions

This paper is a continuation of our previous work in which we studied a sl (3, ?) Zakharov-Shabat type auxiliary linear problem with reductions of Mikhailov type and the corresponding integrable hierarchy of nonlinear evolution equations. Now, we shall demonstrate how one can construct special solutions over constant back- ground through Zakharov-Shabat’s dressing technique. That approach will be illustrated on the example of the generalized Heisenberg ferromagnet equation related to the linear problem for sl (3, ?). In doing this, we shall discuss the differences between the Hermitian and pseudo-Hermitian cases.     

Investigation of soliton solutions with different wave structures to the(2+1)-dimensional Heisenberg ferromagnetic spin chain equation

The principal objective of this article is to construct new and further exact soliton solutions of the(2+1)-dimensional Heisenberg ferromagnetic spin chain equation which investigates the nonlinear dynamics of magnets and explains their ordering in ferromagnetic materials.These solutions are exerted via the new extended FAN sub-equation method.We successfully obtain dark,bright,combined bright-dark,combined dark-singular,periodic,periodic singular,and elliptic wave solutions to this equation which are interesting classes of nonlinear excitation presenting spin dynamics in classical and semi-classical continuum Heisenberg systems.3D figures are illustrated under an appropriate selection of parameters.The applied technique is suitable to be used in gaining the exact solutions of most nonlinear partial/fractional differential equations which appear in complex phenomena.     

计算涡度的新方法

提出应用一维数值微分算法求取观测风场的涡度场,并与中央差分方法作了比较.结果表明,一维数值微分算法稳定、可行且计算精度较高,对较小尺度的天气系统具有较强的识别能力. 关键词： 数值微分 吉洪诺夫正则化 正则化解     

Extended Jacobi elliptic function method and its applications to （2＋l）-dimensional dispersive long-wave equation

An extended Jacobi elliptic function method is proposed for constructing the exact double periodic solutions of nonlinear partial differential equations (PDEs) in a unified way. It is shown that these solutions exactly degenerate to the many types of soliton solutions in a limited condition. The Wu－Zhang equation (which describes the (2+1)-dimensional dispersive long wave) is investigated by this means and more formal double periodic solutions are obtained.