We discuss topics of common interest in the areas of geometry, probability, and combinatorics.
Time | Items |
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All day |
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9am |
05/06/2022 - 9:00am We discuss topics of common interest in the areas of geometry, probability, and combinatorics. Location: |
2pm |
05/06/2022 - 2:00pm Abstract: A complex hyperbolic cusp is an end of a finite-volume quotient of complex hyperbolic space. Up to a finite cover, any such cusp can be realized as the punctured unit disk bundle of a negative line bundle over an abelian variety. The Dirichlet problem for complete Kähler-Einstein metrics on this space with boundary data prescribed on the unit circle bundle is well-posed. We determine the precise asymptotics of its solutions towards the zero section. Time permitting I will also mention an application to gluing constructions for Kähler-Einstein metrics on surfaces of general type. This is joint work with Xin Fu and Xumin Jiang. Location: |
Links
[1] https://math.yale.edu/calendar/grid/day/2022-05-05?field_calendar_tags_tid_selective=%5Btid%5D
[2] https://math.yale.edu/calendar/grid/day/2022-05-07?field_calendar_tags_tid_selective=%5Btid%5D
[3] https://math.yale.edu/event/friday-morning-seminar-11
[4] https://math.yale.edu/event/kahler-einstein-metrics-complex-hyperbolic-cusps
[5] https://math.yale.edu/print/list/calendar/grid/day/2022-05-06
[6] webcal://math.yale.edu/calendar/export.ics