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Узлы и теория представлений
22 февраля 2021 г. 18:30, г. Москва, Join Zoom Meeting ID: 818 6674 5751 Passcode: 141592
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Quaternionic conjugation spaces
F. Yu. Popelenskii Lomonosov Moscow State University, Faculty of Mechanics and Mathematics
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Эта страница: | 130 |
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Аннотация:
There is a considerable amount of examples of spaces $X$ equipped with an involution $\tau$ such that the mod 2–cohomology rings $H^{2*}(X)$ and $H^*(X^\tau)$ are isomorphic. Hausmann, Holm, and Puppe have shown that such an isomorphism is a part of a certain structure on equivariant cohomology of $X$ and $X^\tau$, which is called an $H$-frame. The simplest examples are complex Grassmannians and flag manifolds with complex conjugation. We develop a similar notion of $Q$-frame which appears in the situation when a space $X$ is equipped with two commuting involutions $\tau_1,\tau_2$ and the mod 2-cohomology rings $H^{4*}(X)$ and $H^*(X^{\tau_1,\tau_2})$ are isomorphic. Motivating examples are quaternionic Grassmannians and quaternionic flag manifolds equipped with two complex involutions. We show naturality and uniqueness of $Q$-framing. We prove that $Q$-framing can be defined for direct limits, products, etc. of $Q$-framed spaces. This list of operations contains glueing a disk in $\HH^n$ with complex involutions $\tau_1$ and $\tau_2$ to a $Q$-framed space by an equivariant map of boundary sphere.
An important part of $H$-frame structure in paper by H.–H.–P. was so called conjugation equation. Franz and Puppe calculated the coefficients of the conjugation equation in terms of the Steenrod squares. As a part of a $Q$-framing we introduce corresponding structure equation and express its coefficients by explicit formula in terms of the Steenrod operations.
Язык доклада: английский
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