Differential Geometry-I
- Acquaint with the fundamentals of differential geometry primarily by focusing on the theory of curves and surfaces in three spaces.
- Compute quantities of geometric interest such as curvature, as well as develop a facility to compute in various specialized systems, such as semi geodesic coordinates or ones representing asymptotic lines or principal curvatures.
- Learn about tangent spaces, Surfaces, Gauss map, Geodesics on surfaces and curvature of plane curve.
Course Outcomes (COs):
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Course |
Learning outcomes (at course level) |
Learning and teaching strategies |
Assessment Strategies |
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Paper Code |
Paper Title |
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MAT124 |
Differential Geometry-I (Theory) |
The students will be able to –
CO19: Compute quantities of geometric interest such as curvature, as well as develop a facility to compute in various specialized systems, such as semigeodesic coordinates or ones representing asymptotic lines or principal curvatures. CO20: Develop arguments in the geometric description of curves and surfaces in order to establish basic properties of geodesics, parallel transport, evolutes, minimal surfaces CO21: Determine and calculate curvature of curves in different coordinate systems. CO22: Explain the concepts and language of differential geometry and its role in modern mathematics CO23: Explain the normal curvature of a surface, its connection with the first and second fundamental form and Euler’s theorem CO24: Explain the concepts surfaces of revolution with constant negative and positive Gaussian curvature |
Approach in teaching: Interactive Lectures, Discussion, Tutorials, Reading assignments, Demonstration, Team teaching, PowerPoint presentations.
Learning activities for the students: Self learning assignments, Effective questions, Seminar presentation, Posters and Charts preparation. |
Class test, Semester end examinations, Quiz, Assignments, Presentation, Individual |
- J.L. Bansal and P.R. Sharma, Differential Geometry, Jaipur Publishing House Jaipur, 2013.
- P.P. Gupta and G.S. Malik, Differential Geometry, Pragati Prakashan, Meerut, 2012.
- Prasun Kumar Nayak, Tensor Calculus and Differential Geometry, PHI Learning Pvt. Ltd., 2012.
- Raj Bali, Differential Geometry, Navkar Publication, Ajmer, 2012.
- T. J. Willmore, An Introduction to Differential Geometry, Oxford University Press, London, 1972.
- Dirk J. Struik, Lectures on Classical Differential Geometry, Addison Wesley Publishing Company, London, 1961.
- Erwin Kreyszig, Differential Geometry, Dover Publishing, 1991.
- H.K. Pathak and J.P. Chauhan, Differential Geometry, Shiksha Sahitya Prakashan, 2012.
- Clifford Henry Taube’s, Differential Geometry, Oxford university press, 2011.
- B. D. Neill, Elementary Differential Geometry, Academic Press, London, 1996.
- Nirmala Prakash, Differential Geometry, Tata McGraw Hill, 1981.
- Millan and G. D. Parker, Elements of Differential Geometry, PHI, 1977.
- D. Somasundaram, Differential Geometry, Narosa Publishing House, New Delhi, 2005.
