搜索资源列表
CSharp-Scientific-Computing-Handouts
- 《C#科学计算讲义》较为详细地介绍了科学计算方法,并对算法给出了源代码。关于算法部分主要介绍了线性方程组的迭代解法与直接解法、正交变换与最小二乘计算方法、鲁棒估计、随机数的产生、插值法、非线性方程求解、多元非线性最优化算法、微分方程数值方法等内容。-" C# Scientific Computing Lecture" a more detailed descr iption of the scientific calculation methods, and algorithm
Numerical-Analysis-programs
- 简单的数值分析程序,包括曲线拟合,数值积分,非线性方程求解以及微分方程求解(初值问题)-useful numerical analysis for engineers
test
- 常微分方程的数值解和精确解,数值解法包括Euler方法,改进的Euler方法,2阶R-K方法,4阶经典R-K方法-Numerical solution and exact solution of ordinary differential equations, numerical solutions include Euler method, the improved Euler method, 2 order R- K method, 4 order classical R- K method
linear-element-
- 主要用于求解常微分方程两点边值问题的线性元格式,算法有效的验证了理论。-mainly used for solving two point boundary value problem of linear element scheme for ordinary differential equation , the algorithm effectively verify the theory.
PDE-using-MATLAB
- 用matlab求解偏微分方程,里面含有大量的源代码,特别适用于初学者!-Solving partial differential equations using matlab , which contains a lot of source codes, especially suitable for beginners!
solving-defferential-equations
- 包含三种求微分方程的方法:Euler法,Heun方法,以及Heun with corrector方法。-This package includes three methods for solving differential equation, they are Euler method, Heun method and Heun with corrector method.
bin
- 用五点差分法数值求解二维椭圆型偏微分方程的源代码-one numerical method to solve elliptical partical differential equations
bin
- MATLAB 常微分方程ode函数的几种源代码-numerical functions ordinary differencial equations in matlab
Runge-Kutta
- 自己写的用龙格库塔方法解四阶微分方程,大家一起探讨-a program using the Runge-Kutta method to solve Fourth Order differential equations
f77
- 常见的各类数值和字符算法,包括微积分、插值、矩阵、微分方程、方程组求解和字符串操作等,Fortran77版本,可直接用于各位自己的代码开发中-Most common algorithms, including numerical and char recipes, Fortran 77 version, can be used in your own program develpment directly
f90
- 常见的各类数值和字符算法,包括微积分、插值、矩阵、微分方程、方程组求解和字符串操作等,Fortran90版本,可直接用于各位自己的代码开发中-Most common algorithms, including numerical and char recipes, Fortran 90 version, can be used in your own program develpment directly
mieseng_V6.1
- LZ复杂度反映的是一个时间序列中,信号处理中的旋转不变子空间法,使用大量的有限元法求解偏微分方程。- LZ complexity is reflected in a time sequence, Signal Processing ESPRIT method, Using a large number of finite element method to solve partial differential equations.
nousui
- 高斯白噪声的生成程序,光纤陀螺输出误差的allan方差分析,使用大量的有限元法求解偏微分方程。- Gaussian white noise generator, allan FOG output error variance analysis, Using a large number of finite element method to solve partial differential equations.
kannou_v41
- 通过反复训练模板能有较高的识别率,使用大量的有限元法求解偏微分方程,现代信号处理中谱估计在matlab中的使用。- Through repeated training ibGEjiBlate have higher recognition rate, Using a large number of finite element method to solve partial differential equations, Modern signal processing used in the
hunsun_v42
- 最小均方误差等算法的MSE的计算,包含光伏电池模块、MPPT模块、BOOST模块、逆变模块,使用大量的有限元法求解偏微分方程。- Minimum mean square error MSE calculation algorithm, PV modules contain, MPPT module, BOOST module, inverter module, Using a large number of finite element method to solve partial diffe
jingheng_v85
- 大学数值分析算法,使用大量的有限元法求解偏微分方程,模拟数据分析处理的过程。- University of numerical analysis algorithms, Using a large number of finite element method to solve partial differential equations, Analog data analysis processing.
Galerkin--code
- 一种求解偏微分方程的数值方法,它是有限元方法中重要的一种格式-A method for solving partial differential equation, the numerical method (finite element)
fingqun_v31
- 二维声子晶体FDTD方法计算禁带宽度的例子,有信道编码,调制,信道估计等,使用大量的有限元法求解偏微分方程。- Dimensional phononic crystals FDTD method calculation examples band gap, Channel coding, modulation, channel estimation, Using a large number of finite element method to solve partial differenti
laigiu
- ICA(主分量分析)算法和程序,Gabor小波变换与PCA的人脸识别代码,使用大量的有限元法求解偏微分方程。- ICA (Principal Component Analysis) algorithm and procedures, Gabor wavelet transform and PCA face recognition code, Using a large number of finite element method to solve partial differential eq
miulei_v74
- DSmT证据推理的组合公式计算函数,有较好的参考价值,使用大量的有限元法求解偏微分方程。- Combination formula DSmT evidence reasoning calculation function, There are good reference value, Using a large number of finite element method to solve partial differential equations.