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Cohomology in algebra, geometry, physicsand statistics
(MODULI) SPACES OF RIEMANNIAN METRICS
Speaker’s name:
Wilderich Tuschmann
Speaker’s affiliation:
Karlsruhe Institute of Technology
Place:
ZOOM meeting
Date:
Wednesday, 24. February 2021 - 11:30 to 12:30
Abstract:
Consider a smooth manifold with a Riemannian metric satisfying some sort of curvature constraint like, for example, positive scalar curvature, non-negative Ricci or negative sectional curvature, being Einstein, Kähler, Sasaki, etc. A natural question to study is then what the space of all such metrics does look like. Moreover, one can also pose this question for corresponding moduli spaces of metrics, i.e., quotients of the former by (suitable subgroups of) the diffeomorphism group of the manifold, acting by pulling back metrics.
These spaces are customarily equipped with the topology of smooth convergence on compact subsets and the quotient topology, respectively, and their topological properties then provide the right means to measure 'how many' different metrics and geometries the given manifold actually does exhibit; but one can topologize and view those also in very different manners.
In my talk, I will report on some general results and open questions about spaces and moduli spaces of metrics with a focus on non-negative Ricci or sectional curvature as well as other lower curvature bounds on closed and open manifolds, and, in particular, also discuss broader non-traditional approaches from metric geometry and analysis to these objects and topics.
----------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------
ZOOM shall be opened at 11.15 and closed at 13.00.
Join ZOOM at
https://cesnet.zoom.us/j/99598413922?pwd=c2Y0TENuZHdDQ3hDWEkySFI3YWo3QT09
Meeting ID: 995 9841 3922
Passcode: cartan
These spaces are customarily equipped with the topology of smooth convergence on compact subsets and the quotient topology, respectively, and their topological properties then provide the right means to measure 'how many' different metrics and geometries the given manifold actually does exhibit; but one can topologize and view those also in very different manners.
In my talk, I will report on some general results and open questions about spaces and moduli spaces of metrics with a focus on non-negative Ricci or sectional curvature as well as other lower curvature bounds on closed and open manifolds, and, in particular, also discuss broader non-traditional approaches from metric geometry and analysis to these objects and topics.
----------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------------
ZOOM shall be opened at 11.15 and closed at 13.00.
Join ZOOM at
https://cesnet.zoom.us/j/99598413922?pwd=c2Y0TENuZHdDQ3hDWEkySFI3YWo3QT09
Meeting ID: 995 9841 3922
Passcode: cartan