Lecture 14 - Knots and the Wirtinger Presentation
00:00 - Introduction and intuition
2:59 - Formal Definition of knots and equivalence
9:48 - Knot Diagrams and Reidemeister moves
23:42 - Wirtinger Presentation
41:20 - Wirtinger presentation of the trefoil
50:08 - The trefoil group is not abelian
Видео Lecture 14 - Knots and the Wirtinger Presentation канала Gabriel Islambouli
2:59 - Formal Definition of knots and equivalence
9:48 - Knot Diagrams and Reidemeister moves
23:42 - Wirtinger Presentation
41:20 - Wirtinger presentation of the trefoil
50:08 - The trefoil group is not abelian
Видео Lecture 14 - Knots and the Wirtinger Presentation канала Gabriel Islambouli
Показать
Комментарии отсутствуют
Информация о видео
Другие видео канала
Lecture 2 - Quotient topology and CW ComplexesLecture 8 - Applications of Van Kampen's theoremLecture 25 - The Euler characterisitcLecture 3 Homotopy equivalence and homotopy extensionLecture 10 - Covers and Induced MapsLecture 4 - The fundamental groupLecture 20 - Exact SequencesStatistics with Python - Maximum Likelihood EstimatesLecture 17 Chain homotopy and invariance of homologyStatistics with Python - Hypothesis TestingLecture 12 - Deck TransformationsLecture 26 - Homology with coefficientsLecture 21 - The Mayer-Vietoris SequenceLecture 13 - Continuous Group ActionsLecture 9 - Surfaces and their fundamental groupsLecture 23 - Degree theory for spheresLecture 19 - Homology and the Fundamental GroupLecture 5 - Covering Spaces and the Fundamental group of the circleLecture 18 - Free abelian groupsLecture 16 - Singular homology and induced maps