An official website of the United States government
- Home
- Search Results
- Page 1 of 1
Search for: All records
-
Total Resources6
- Resource Type
-
0000000006000000
- More
- Availability
-
60
- Author / Contributor
- Filter by Author / Creator
-
-
Shin, Sug Woo (5)
-
Kret, Arno (2)
-
Beuzart-Plessis, Raphaël (1)
-
Fintzen, Jessica (1)
-
Kisin, Mark (1)
-
MARSHALL, SIMON (1)
-
Madapusi Pera, Keerthi (1)
-
Paškūnas, Vytautas (1)
-
SHIN, SUG WOO (1)
-
#Tyler Phillips, Kenneth E. (0)
-
#Willis, Ciara (0)
-
& Abreu-Ramos, E. D. (0)
-
& Abramson, C. I. (0)
-
& Abreu-Ramos, E. D. (0)
-
& Adams, S.G. (0)
-
& Ahmed, K. (0)
-
& Ahmed, Khadija. (0)
-
& Aina, D.K. Jr. (0)
-
& Akcil-Okan, O. (0)
-
& Akuom, D. (0)
-
- Filter by Editor
-
-
& Spizer, S. M. (0)
-
& . Spizer, S. (0)
-
& Ahn, J. (0)
-
& Bateiha, S. (0)
-
& Bosch, N. (0)
-
& Brennan K. (0)
-
& Brennan, K. (0)
-
& Chen, B. (0)
-
& Chen, Bodong (0)
-
& Drown, S. (0)
-
& Ferretti, F. (0)
-
& Higgins, A. (0)
-
& J. Peters (0)
-
& Kali, Y. (0)
-
& Ruiz-Arias, P.M. (0)
-
& S. Spitzer (0)
-
& Sahin. I. (0)
-
& Spitzer, S. (0)
-
& Spitzer, S.M. (0)
-
(submitted - in Review for IEEE ICASSP-2024) (0)
-
-
Have feedback or suggestions for a way to improve these results?
!
Note: When clicking on a Digital Object Identifier (DOI) number, you will be taken to an external site maintained by the publisher.
Some full text articles may not yet be available without a charge during the embargo (administrative interval).
What is a DOI Number?
Some links on this page may take you to non-federal websites. Their policies may differ from this site.
-
Kret, Arno; Shin, Sug Woo (, Journal de l’École polytechnique — Mathématiques)
-
Kret, Arno; Shin, Sug Woo (, Journal of the European Mathematical Society)
-
Kisin, Mark; Madapusi Pera, Keerthi; Shin, Sug Woo (, Duke Mathematical Journal)
-
Fintzen, Jessica; Shin, Sug Woo; Beuzart-Plessis, Raphaël; Paškūnas, Vytautas (, Cambridge Journal of Mathematics)
-
MARSHALL, SIMON; SHIN, SUG WOO (, Forum of Mathematics, Sigma)By assuming the endoscopic classification of automorphic representations on inner forms of unitary groups, which is currently work in progress by Kaletha, Minguez, Shin, and White, we bound the growth of cohomology in congruence towers of locally symmetric spaces associated to $U(n,1)$ . In the case of lattices arising from Hermitian forms, we expect that the growth exponents we obtain are sharp in all degrees.more » « less
