Kunakovskaya O.V. Boundary topological indices of a pair of vector fields and existence theorems (abstract): Difference between revisions
Jump to navigation
Jump to search
Created page with "{{MeetingTalk | speaker = Olga Kunakovskaya | title = Boundary topological indices of a pair of vector fields and existence theorems | abstract = The problem of the existence..." |
No edit summary |
||
| Line 6: | Line 6: | ||
<math>F_2 (x)=\lambda F_1 (x)</math> | <math>F_2 (x)=\lambda F_1 (x)</math> | ||
will be discussed. The method of topological boundary index is proposed. The topological boundary (bi)index <math>B (F_1, F_2)</math> is additive and admits also a local form. The construction for smooth fields <math>F_1, F_2</math> and some applications one can find in the monograph: | will be discussed. The method of topological boundary index is proposed. The topological boundary (bi)index <math>B (F_1, F_2)</math> is additive and admits also a local form. The construction for smooth fields <math>F_1, F_2</math> and some applications one can find in the monograph: Kunakovskaya O.V. Topological indices of a pair of fields (Topologicheskije indexi pary polej). Voronezh, Nauchnaya kniga, 2020. 88 pp., in Russian. | ||
| slides = | | slides = | ||
| references = | | references = | ||
Revision as of 21:10, 15 November 2021
Speaker: Olga Kunakovskaya
Title: Boundary topological indices of a pair of vector fields and existence theorems
Abstract:
The problem of the existence of solutions of equations of the type
will be discussed. The method of topological boundary index is proposed. The topological boundary (bi)index is additive and admits also a local form. The construction for smooth fields and some applications one can find in the monograph: Kunakovskaya O.V. Topological indices of a pair of fields (Topologicheskije indexi pary polej). Voronezh, Nauchnaya kniga, 2020. 88 pp., in Russian.
Event: Diffieties, Cohomological Physics, and Other Animals, 13-17 December 2021, Moscow.
Alexandre Vinogradov Memorial Conference.