Posts about numerical methods
- Coming back to the Boundary element method
- Numerical methods challenge: Summary
- Numerical methods challenge: Day 31 - Putting things together
- Numerical methods challenge: Day 30 - Conjugate gradient
- Numerical methods challenge: Day 29 - Cholesky decomposition
- Numerical methods challenge: Day 28 - LU factorization
- Numerical methods challenge: Day 27 - Monte Carlo integration
- Numerical methods challenge: Day 26 - Boundary element method
- Numerical methods challenge: Day 25 - Finite elements
- Numerical methods challenge: Day 24 - Finite elements
- Numerical methods challenge: Day 23 - Ritz method
- Numerical methods challenge: Day 22 - Finite differences for eigenproblems
- Numerical methods challenge: Day 21 - Jacobi iteration
- Numerical methods challenge: Day 20 - Shotting method
- Numerical methods challenge: Day 19 - Verlet integration
- Numerical methods challenge: Day 18 - Runge-Kutta method
- Numerical methods challenge: Day 17 - Euler method
- Numerical methods challenge: Day 16 - Clenshaw-Curtis quadrature
- Numerical methods challenge: Day 15 - Simpson's rule
- Numerical methods challenge: Day 14 - Trapezoidal rule
- Numerical methods challenge: Day 13 - Cubic splines
- Numerical methods challenge: Day 12 - Hermite interpolation
- Numerical methods challenge: Day 11 - Vandermonde matrices
- Numerical methods challenge: Day 10 - Runge phenomenon
- Numerical methods challenge: Day 9 - Lagrange interpolation
- Numerical methods challenge: Day 8 – Newton's method for optimization
- Numerical methods challenge: Day 7 – Nelder-Mead
- Numerical methods challenge: Day 6 – Gradient descent
- Numerical methods challenge: Day 5 – Broyden's method
- Numerical methods challenge: Day 4 – Newton's method
- Numerical methods challenge: Day 3 – Newton's Method
- Numerical methods challenge: Day 2 – Regula falsi
- Numerical methods challenge: Day 1 – Bisection method