This course will cover important concepts from computability theory; techniques for designing efficient algorithms for combinatorial, algebraic, and number-theoretic problems; and basic concepts such as NP-Completeness from computational complexity theory
Students are expected to have a solid grasp of the basics of discrete mathematics. Discrete Mathematics and Its Applications by Ken Rosen provides an excellent background for this course.
If you answer “no” to any of the following questions, it may be beneficial to acquire background knowledge concurrently or prior to taking the course.
The course is intended to be self-contained. Nevertheless, for their reference, we recommend that students acquire copies of
Similar texts may be substituted if they are more readily available to the student.