An advanced course in Fourier Methods dealing with the application of Fourier series, Fourier transforms, convolution, correlation, discrete and fast...
Series solutions of differential equations. Bessel's equation and Bessel functions. Legendre's differential equation. Derivation of some partial...
Propositional and predicate calculus, first order theories, undecidability. Resolution and Horn clauses, logic programming (Prolog). Effective...
Students will learn the basics of design theory, with particular emphasis on error correcting and detecting codes. Such codes are widely used in...
Emphasis on the interplay between theory, application and numerical techniques. Review of vector spaces, complexity of algorithms and numerical...
Order of Growth notation, time and space complexities of DTMs and NDTMs, intractability, basic complexity classes, P=NP?, reducibility and...
This course will consider the mathematics of modern cryptographic schemes, including commonly used public and private key systems. The main uses;...
Elementary principles of counting, partitions, and applications. Generating functions, recurrence equations. Groups of permutations and their...
Continuous and discrete image representation. Sampling and reconstruction. Quantization. Spatial domain and intensity transformations. Convolution....