Transforms a continuous transfer function to a discrete transfer function using the forward and backward Euler methods.
-
Updated
Sep 17, 2023 - MATLAB
Transforms a continuous transfer function to a discrete transfer function using the forward and backward Euler methods.
This repository includes numerical integration-based solutions for solving non-linear equations. The solutions include Newton Raphson technique for algebraic equations and Euler's/Modified-Euler's/Runge-Kutta (RK4) for differential algebraic equations.
A finite difference code to compute compressible flow around an ellipse in MATLAB
This repository contains algorithms written in MATLAB/Octave. Developing algorithms in the MATLAB environment empowers you to explore and refine ideas, and enables you test and verify your algorithm.
1D Schroedinger solver in semiconductor with non-parabolicity
Inverse dynamics with recursive Newton-Euler of an open kinematic chain described with standard DH-parameters
1D Schroedinger solver in semiconductor with effective mass
1D Schrodinger solver with effective mass on NON-REGULAR GRID
1D Time independent Schroedinger equation solver
Quarter car model analysis with ODE solving methods (Heun, RK4, Euler, Midpoint)
Studies on the computation of a mathematical model of the heart rate control by sympathetic and vagus efferent information, according to: https://journals.physiology.org/doi/abs/10.1152/jappl.1962.17.2.349 [Co-author]
Supplementary materials for Siggraph 2018 technical paper Perception Aware Modeling and Fabrication of Digital Drawing Tools
FEM solver applying mesh from third-party mesh generating software
Solutions that I have coded to a variety of projecteuler.net problems in Python and MATLAB.
Programs and articles related to cubesat tracking and attitude control.
Simulation of a simple harmonic oscillator pendulum using 3 different numerical methods with MATLAB.
Numerical simulation of radioactive decay using Euler method.
A 2D particle based gravity simulator using MATLAB
Add a description, image, and links to the euler topic page so that developers can more easily learn about it.
To associate your repository with the euler topic, visit your repo's landing page and select "manage topics."