Community Profile

photo

KAMDEM K. Paul Didier


9 total contributions since 2019

Research Scholar,
Power and Electrical Engineering/
Physics/Elecronics,
University of Dschang/Cameroon;

Professional Interests: Dynamic systems, Chaos and control, digital electronics devices, FPGA, VHDL, computer programming, Design of electronic/electro-mechanical systems, Simulation of Electrical machines, Electric Power Distribution Systems, Generation, Renewable Energy, Power Systems,...

Contact

KAMDEM K. Paul Didier's Badges

  • Personal Best Downloads Level 2
  • First Submission

View details...

Contributions in
View by

Submitted


Compare Euler Heun RK4 methods
This file provides a brief comparison between Euler, Heun and RK4 algorithms for the solving of nonlinear ODE.

8 days ago | 4 downloads |

Thumbnail

Submitted


Runge-Kutta 4 method
This function helps to solve linear and nonlinear third order ODE systems using the fourth order Runge-Kutta algorithm

8 days ago | 11 downloads |

Thumbnail

Submitted


Euler algorithm
This function helps to solve linear and nonlinear third order ODE systems using the Heun algorithm. The code can be extended to ...

8 days ago | 6 downloads |

Thumbnail

Submitted


Heun's method
Function helping to solve nonlinear and linear third order ODE systems using the Heun numerical method.

8 days ago | 9 downloads |

Thumbnail

Submitted


Runge-kutta algorithm (RK4)
Program to numerically solve any dynamic system described by ODEs (no matter its dimension) using the 4th order Runge-Kutta met...

8 days ago | 8 downloads |

Thumbnail

Submitted


4 Inputs Perceptron Training
The step by step training of a four inputs perceptron.

8 days ago | 9 downloads |

Thumbnail

Submitted


2 inputs Perceptron Training
The step by step training of a two input perceptron with bias.

8 days ago | 6 downloads |

Thumbnail

Submitted


Rossler Attractor
Simulation of the dynamical behaviour of the famous Rossler chaotic system

8 days ago | 6 downloads |

Thumbnail

Submitted


Lorenz Attractor
Simulation of dynamic behaviours of the legendary Lorenz's chaotic system.

8 days ago | 7 downloads |

Thumbnail