MATH 425
Riemannian Geometry
Fall 2012
Division III
Quantitative/Formal Reasoning
This is not the current course catalog
Class Details
Differential geometry studies smooth surfaces in all dimensions, from curves to the universe. Riemannian geometry shows that curvature is the key to understanding shape, from the curvature of a curve in calculus to the curvature of space in general relativity. Sharp corners and black holes are singularities that require extensions of the theory. We will look at some open questions.
The Class:
Format: tutorial
Limit: 10
Expected: 10
Class#: 1250
Grading: OPG
Limit: 10
Expected: 10
Class#: 1250
Grading: OPG
Requirements/Evaluation:
evaluation will be based on homework, classwork, problem sets, projects, and exams
Prerequisites:
Mathematics 301 or 305
Distributions:
Division III
Quantitative/Formal Reasoning
Class Grid
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MATH 425 - T1 (F) TUT Riemannian Geometry
MATH 425 - T1 (F) TUT Riemannian GeometryDivision III Quantitative/Formal ReasoningFrank MorganTBA1250
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