Graphs are everywhere. In discrete mathematics, they are structures that show the connections between points, much like a ...

It’s just that learning them doesn’t feel as enjoyable as a favourite hobby or meal.But what if this fun-gap is reduced — and ...

Graph skills are crucial for problem solving and working with data. So plot your course to success by practicing these skills. Explore our e-library for topics in Foundations Maths. From Coordinates, ...

Covering point process theory, random geometric graphs and coverage processes, this rigorous introduction to stochastic geometry will enable you to obtain powerful, general estimates and bounds of ...

This includes basic notions such as sets and functions: Properties of sets, definition and properties of functions; logarithms and exponentials: and their properties; basic series summations: ...

The information and materials presented here are intended to provide a description of the course goals for current and prospective students as well as others who are interested in our courses. It is ...

Topics covered include: finite and infinite abstract ergodic theory, Young's towers, measure-theoretic Kolmogorov-Sinai entropy, thermodynamics formalism, geometric function theory, various kinds of ...

This is where we are right now. Today, they dig deeper, to help us see new layers of a problem and start to solve it.

In contrast, GVA leverages the geometry of a cone to allow nature to run the dilution series for you at 30X the speed! Fortunately, you likely have a cone sitting on your bench in the form of a ...

Sarah Morris is an American contemporary artist famous for her abstract paintings and films that explore urban environments, architecture, and cultural symbols through bold geometric patterns and ...

Before engineers at Carnegie Mellon University begin conducting additive manufacturing (AM) experiments in two dedicated labs ...

When it comes to electrically conductive nanomaterials, graphene—stronger and lighter than steel and more conductive than ...