![]() Multiple Choice, in the style of Exercise Sheet 12. You can decide in which order to solve them and how to manage your time. Please bring your student card (legi) and your valid Covid certificate (3G), PRINTED. Special Rules: Wear a surgical or FFP2 mask. The doors will open at 8:30.įrom B to H in room F3 of the main building (HG)įrom K to Z in room F1 of the main building (HG) Make sure that your solution is one PDF file and that its file name is formatted in the following way: In order to access the website you will need a NETHZ-account and you will have to be connected to the ETH-network.įrom outside the ETH network you can connect to the ETH network via VPN. Please, upload your solution via the SAM upload tool. You have time until the following Monday at 12:15 to upload your solutions. ![]() ![]() You are supposed to have a look at it before the exercise class, so that you can ask questions if you need to. The new exercise sheet will be uploaded on this page on Monday. Here you can find some handwritten notes covering the last part of the course: Written notes: differential forms and Stokes' Theorem Here you can find some notes supplementing the audio: Missing video: October 6th and October 13thĭue to some technical issues, the recordings of the lectures of Wednesday October 6thĪnd of Wednesday October 13th are compromised. Recordings will be available and should be published The lecture will be streamed live on the ETH Video Portal. Presented to enter the room for in-person teaching. Lectures will take place in-person and will be live streamed.ĮTH Guidelines, a COVID certificate together with an ID card or Legi should be The course will follows the Differential Geometry I course taught by Prof. Sard's Theorem, mapping degree and intersection number, vector bundles, vector fields and flows, differential forms, Stokes' Theorem. Differentiable manifolds, immersions and embeddings, Theorema Egregium, Theorem of Gauss-Bonnet. Introduction to differential geometry and differential topology.Ĭontents: Curves, (hyper-)surfaces in \(\mathbb^n\), geodesics, curvature, Wednesday, 14:15 - 16:00 in HG E 5 Content In this attractive, inexpensive paperback edition, it belongs in the library of any mathematician or student of mathematics interested in differential geometry.Differential Geometry I Autumn 2021 Lecturer: Joaquim Serra Coordinator: Tommaso Goldhirsch Time and Location: Monday, 14:15 - 16:00 in ML H 44 The result was to further increase the merit of this stimulating, thought-provoking text - ideal for classroom use, but also perfectly suited for self-study. Struik has enhanced the treatment with copious historical, biographical, and bibliographical references that place the theory in context and encourage the student to consult original sources and discover additional important ideas there.įor this second edition, Professor Struik made some corrections and added an appendix with a sketch of the application of Cartan's method of Pfaffians to curve and surface theory. Written by a noted mathematician and historian of mathematics, this volume presents the fundamental conceptions of the theory of curves and surfaces and applies them to a number of examples. A selection of more difficult problems has been included to challenge the ambitious student. The text features an abundance of problems, most of which are simple enough for class use, and often convey an interesting geometrical fact. It is aimed at advanced undergraduate and graduate students who will find it not only highly readable but replete with illustrations carefully selected to help stimulate the student's visual understanding of geometry. ![]() ![]() Elementary, yet authoritative and scholarly, this book offers an excellent brief introduction to the classical theory of differential geometry. ![]()
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