The study of differential algebraic geometry and model theory occupies a pivotal position at the interface of algebra, geometry, and logic. Differential algebraic geometry investigates solution sets ...

Differential geometry is the study of smooth manifolds and the intrinsic properties of spaces that can be described locally by Euclidean geometry. Within this expansive field, singularities represent ...

Shiing-shen Chern, 93, a Chinese American mathematician famous for his breakthroughs in differential geometry, died Friday of natural causes in the northeastern Chinese city of Tianjin. Chern, who ...

Vol. 10, Differential Geometry in Statistical Inference (1987), pp. i-iii+1-17+19+21-95+97-161+163+165-217+219-240 (237 pages) The Institute of Mathematical Statistics Lecture Notes–Monograph Series ...

Application of tools from differential geometry and Lie groups to problems in dynamics, controllability, and motion planning for mechanical systems, particularly with non-Euclidean configuration ...

Differential equations are fundamental tools in physics: they are used to describe phenomena ranging from fluid dynamics to general relativity. But when these equations become stiff (i.e. they involve ...

The term “moduli space” was coined by Riemann for the space $\mathfrak{M}_g$ parametrizing all one-dimensional complex manifolds of genus $g$. Variants of this ...

All prerequisite courses must be passed with a grade of C- or better. For official course descriptions, please see the current CU-Boulder Catalog. MATH 3001 Analysis 1 Provides a rigorous treatment of ...

Assistant professors Jiahui Chen and Chen Liu are pursuing separate projects: Chen looking at approaches to protein interaction, and Liu is focusing on understanding the flow of fluids.