Integrality of p-adic multiple zeta values and application to finite multiple zeta values

Media type: E-Book; Video
Title: Integrality of p-adic multiple zeta values and application to finite multiple zeta values
Contributor: Yasuda, Seidai [Author]; Abbes, Ahmed (Organization) [Other]; Hu, Yongquan (Organization) [Other]; Orgogozo, Fabrice (Organization) [Other]; Saito, Takeshi (Organization) [Other]; Shiho, Atsushi (Organization) [Other]; Tian, Ye (Organization) [Other]; Tsuji, Takeshi (Organization) [Other]; Zheng, Weizhe (Organization) [Other]
Published: [Erscheinungsort nicht ermittelbar]: Institut des Hautes Études Scientifiques (IHÉS), 2015
Published in: Séminaire de Géométrie Arithmétique Paris-Pékin-Tokyo ; (Jan. 2015)
Extent: 1 Online-Ressource (1036 MB, 01:16:34:24)
Language: English
DOI: 10.5446/20852
Identifier:

Origination:
Footnote: Audiovisuelles Material
Description: I will give a proof of an integrality of p-adic multiple zeta values. I would also like to explain how it can be applied to give an upper bound of the dimension of finite multiple zeta values. Two errata on the proof of Theorem 1. 1. The claim ``we have canonical lifts of Frobenius on Z_T and Z_U" is not correct. It should read ``we have canonical lifts of Frobenius on the p-adic completions of Z_T and Z_U". 2. The weight filtration on the module H does not satisfy W_0 H = H. It should read W_{-1}H = 0
Access State: Open Access
Rights information: Attribution - Non Commercial (CC BY-NC)

Search in field: