Math 589A - Algorithms of Applied Mathematics I - Fall 2024

Floating point arithmetic. Numerical linear algebra: Singular Value Decomposition, QR and LU factorizations. Eigenvalues and eigenvectors. Systems of non-linear equations: functional iteration, Newton"s method. Numerical Differential Equations: basic integration schemes, order of accuracy. Initial Value Problem: Euler method, explicit-implicit methods, stability, Runge-Kutta methods, adaptive step size. Boundary Value Problem: shooting method, quasi-linearization. Other topics as chosen by the instructor.

Least squares problem. Unconstrained Optimization: gradient descent with backtracking, Newton method; constrained optimization: primal-dual Newton, interior point methods; linear programming. Inference and Learning Algorithms: sampling algorithms, Monte-Carlo method, importance sampling, stochastic optimization; regression, classification, clustering. Other topics as chosen by the instructor.