DIFFERENTIAL GEOMETRY

Name: DIFFERENTIAL GEOMETRY
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Rating: 4.8 (220 reviews)

MATH 765

과목 설명

Covers the metric properties of Riemannian manifolds. The following topics will be covered: Vector bundles and connections, Riemannian metrics, submanifolds and second fundamental form, first variation of arc length, geodesics, Hopf-Rinow theorem, second variation of arc length, Jacobi fields and index lemmas, Bonnet-Meyer theorem, Rauch comparison theorem, spaces of constant curvature, Hodge-de Rham theory. Familiarity with the topics in a differential manifolds course (e.g.MATH 761) is strongly recommended.

선수과목

Graduate/professional standing or member of the Pre-Masters Mathematics (Visiting International) Program

충족 요건

This course does not satisfy any prerequisites.

학점

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평점

3.63

-5.9% 과거 데이터 대비

수료율

100%

1.38% 과거 데이터 대비

A 비율

33.33%

-62.96% 과거 데이터 대비

학급 규모

-1.82% 과거 데이터 대비

Cumulative Grade Distribution

강사 (2026 Summr)

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유사 과목

DIFFERENTIABLE MANIFOLDS

MATH 761

Differentiable manifolds, vector bundles, implicit function theorem, submersions and immersions, vector fields and flows, foliations and Frobenius theorem, differential forms and exterior calculus, integration and Stokes' theorem, De Rham theory, Riemannian metrics. Familiarity with basic undergraduate analysis coursesMATH 521and522orMATH 621) is strongly recommended.

DIFFERENTIAL GEOMETRY

MATH 561

Theory of curves and surfaces by differential methods.

ADVANCED TOPICS IN GEOMETRY

MATH 865

Selected from advanced projective geometry, non-Euclidean geometry, Riemannian geometry, distance geometry and the geometry of convex surfaces, geometry of numbers.

TOPICS IN DIFFERENTIAL TOPOLOGY

MATH 856

The theory of differential manifolds such as differential forms and de Rham theorem, cobordism groups, Lie groups, homogeneous spaces, fiber bundles, characteristic classes.

INTRODUCTION TO MANIFOLDS

MATH 621

Integration in Euclidean spaces, change of variables, multilinear algebra, vector fields and differential forms, manifolds and tangent spaces, integration on manifolds, Stokes theorem. Classical vector analysis. Cauchy integral theorem.