搜索资源列表
FDM-(1)
- a source to solve linear equation
FDM-(2)
- a source to solve linear equation
FDM-(3)
- a source to solve linear equation
FDM-(4)
- a source to solve linear equation
FDM-(5)
- a source to solve linear equation
OFDM
- FDM技术由MCM(Multi-Carrier Modulation,多载波调制)发展而来。OFDM技术是多载波传输方案的实现方式之一,它的调制和解调是分别基于IFFT和FFT来实现的,是实现复杂度最低、应用最广的一种多载波传输方案。(This paper deals with the technologies of channel estimation and equalization for OFDM system.)
finite
- 此程序描述了带有内热源的三维正方体的传热程序模拟,运用了有限差分法。(This procedure describes the heat transfer process with three-dimension cube heat source simulation using finite difference method.)
1dsteady&unsteady
- 含一维定常非定常对流/扩散方程的有限差分法和对流项和时间积分的不同格式。(containing codes for solving the one-dimensional steady and unsteady convection/diffusion equation, using Finite Difference method and different schemes for convective terms and tim
two dimension laminar NS
- 二维Navier Stokes方程求解层流新代码(定常或非定常)采用有限体积法和非正交结构化网格与并置排列的变量。H、O和C-网格可以使用,用多重网格的水平。(the new codes for solving the laminar two-dimensional Navier-Stokes equations (steady or unsteady) using Finite-Volume method and non-ortho
ht
- 3D heat transfer using FDM
Lab3_FDM
- matlab code for FDM MODULATION
band_filter_main
- 频分多路复用滤波器,将多路基带信号调制到不同频率载波上再进行叠加形成一个复合信号(a Frequency Division multiplexer.)
Program1_SimpleLaplaceSolver
- Gauss, Siedel, Jacobi Method to determine field distribution
Numerical Project
- Finite Difference Method (FDM) in matlab
书籍computational_fluid_dynamics
- Computational fluid dynamics has been a hot topic of research these last forty years, and several books have been published on this topics. This book concentrates on the numerical of Computational Fluid Mechanics, foll
fdm
- r program and d program
wavy cavity
- Wavy cavity nanofluid flow FDM ADI method
FDM.m
- Matlab对单自由度系统的解析解的编程,求出瞬态和稳态位移响应(Matlab's programming of the analytical solution of a single degree of freedom system for transient and steady state displacement responses)
aa
- 有限差分,前差后差中心差的具体实现方式.分析这三种差分方式的精度、误差可以与精确解比较,观察发散的原因(program to gain the value of each grid point using FDM)
laplace
- we use fdm method to simulate the laplace partial differential equations. thus you can have a better understand of both the fdm and laplace.