Many students walk into their first year of college calculus with nervous anticipation, bracing for a whirlwind of equations, integrals and derivatives. However, for students taking calculus with ...

This rapidly evolving field extends classical discrete calculus by introducing non-integer, or fractional, orders of difference operators. Such an approach is particularly well suited to modelling ...

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 ...

Majors usually begin by taking the calculus sequence. By the end of their first year, it is highly suggested for students to take either of the introductory proof classes (Discrete Math or Number ...

We are one of the largest and oldest discrete math groups in Canada. Our group has a wide variety of expertise in pure and applied discrete math and combinatorics. Our research themes include ...

Introduces students to ideas and techniques from discrete mathematics that are widely used in science and engineering. Mathematical definitions and proofs are emphasized. Topics include formal logic ...

The discrete nonlinear Schrödinger equation (DNLS) is a fundamental mathematical model that describes the evolution of wave amplitudes in lattice systems where the interplay between dispersion and ...

Increase your mathematical future exponentially at an R1 flagship technological university where geeking out over math (and doing it for fun!) is the norm. Work with caring, award-winning faculty.

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