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 ...

If you are interested in the real-world applications of numbers, discrete mathematics may be the concentration for you. Because discrete mathematics is the language of computing, it complements the ...

Taiwanese Journal of Mathematics, Vol. 14, No. 4 (August 2010), pp. 1537-1542 (6 pages) The domination number γ(G) of a graph G is the minimum cardinality among all dominating sets of G, and the ...

This course will discuss fundamental concepts and tools in discrete mathematics with emphasis on their applications to computer science. Example topics include logic and Boolean circuits; sets, ...

Graph Domination Theory is a fundamental area in combinatorial optimisation and theoretical computer science that examines dominating sets and their diverse extensions. At its core, a dominating set ...

Discrete structures are omnipresent in mathematics, computer science, statistical physics, optimisation and models of natural phenomena. For instance, complex random graphs serve as a model for social ...

Taiwanese Journal of Mathematics, Vol. 13, No. 5 (October 2009), pp. 1397-1410 (14 pages) Let G be a simple undirected graph. Denote by mi(G) (respectively, xi(G)) the number of maximal (respectively, ...

At 21, Ashwin Sah has produced a body of work that senior mathematicians say is nearly unprecedented for a college student. The proof joined a long list of mathematical results that Sah, who turned 21 ...