Please note: not all courses are allowed for all campuses. Courses that have restrictions will be marked with the campus that does not allow it's students to take the course.
This course will describe efficient computational techniques for solving matrix problems. Both the theoretical foundations of the methods and practical considerations for how to implement the methods efficiently will be emphasized. Practical...
The first variational problem, necessary conditions. Euler's equation. Generalization to dependent and independent variables. Constraints and Lagrange multipliers. Application to dynamics and elasticity. Direct methods.
