Discrete Mathematics is a subject that has gained prominence in recent times. Unlike regular Maths, where we deal with real numbers that vary continuously, Discrete Mathematics deals with logic that ...

Presents propositional logic, combinatorics, methods of proof, mathematical systems, algebra of sets, matrix algebra, relations and functions, recursion and generating functions, applications to ...

The so-called differential equation method in probabilistic combinatorics presented by Patrick Bennett, Ph.D., Department of Mathematics, Western Michigan University Abstract: Differential equations ...

This course is available on the MSc in Applicable Mathematics. This course is available as an outside option to students on other programmes where regulations permit. Students should be taking the ...

Discrete Mathematics plays an important role in explaining key concepts in Information Technology and Computer Science, This course explores topics in logic, relationships between data, number theory ...

The term discrete studies is intended to capture a diverse family of research topics which entail elements of finitary or discrete mathematics and exact reasoning. Simon Fraser University houses ...

Our mathematics courses introduce students to the disciplines of theoretical and applied mathematics, from theoretical courses in analysis and algebra to applied courses such as Ordinary Differential ...

Gallai–Ramsey theory lies at the intersection of graph colouring and Ramsey theory, providing a framework for understanding how structures emerge in edge-coloured graphs. Central to this domain is the ...

Power graphs provide an innovative way to visualise and analyse the algebraic structure of finite groups. In a power graph, the elements of a finite group serve as vertices, and an edge is drawn ...