Zeta elements in depth 3 and the fundamental Lie algebra of the infinitesimal Tate curve

Zeta elements in depth 3 and the fundamental Lie algebra of the infinitesimal Tate curve

This paper draws connections between the double shuffle equations and structure of associators; universal mixed elliptic motives as defined by Hain and Matsumoto; and the Rankin-Selberg method for modular forms for $SL_2(\mathbb{Z})$. We write down explicit formulae for zeta elements $\sigma_{2n-1}$...

书目详细资料
主要作者:	Brown, F
格式:	Journal article
出版:	Cambridge University Press 2017

相似书籍

ZETA ELEMENTS IN DEPTH 3 AND THE FUNDAMENTAL LIE ALGEBRA OF THE INFINITESIMAL TATE CURVE
由: FRANCIS BROWN
出版: (2017-01-01)

A Tannakian Interpretation of the Elliptic Infinitesimal Braid Lie Algebras
由: Enriquez, Benjamin, et al.
出版: (2018)

New Applications of a Kind of Infinitesimal-Operator Lie Algebra
由: Honwah Tam, et al.
出版: (2016-01-01)

Locally Homogeneous Manifolds Defined by Lie Algebra of Infinitesimal Affine Transformations
由: Vladimir A. Popov
出版: (2022-12-01)

Motivic zeta functions of infinite-dimensional Lie algebras
由: Du Sautoy, M, et al.
出版: (2004)

INFINITESIMAL CHEREDNIK ALGEBRAS AS W-ALGEBRAS
由: Losev, I., et al.
出版: (2017)

The affine Yangian of gl₁, and the infinitesimal Cherednik algebras
由: Tsymbaliuk, Oleksandr
出版: (2014)

Algebraic relations among Goss’s zeta values on elliptic curves
由: Nathan Green, et al.
出版: (2023-01-01)

Curves on ruled surfaces under infinitesimal bending
由: Najdanović Marija, et al.
出版: (2021-01-01)

Symbolic Computation of the Lie Algebra <i>se</i>(3) of the Euclidean Group <i>SE</i>(3): An Application to the Infinitesimal Kinematics of Robot Manipulators
由: Jaime Gallardo-Alvarado, et al.
出版: (2024-08-01)

On the dimension of Lie algebras of infinitesimal affine transformations of direct products of more than two spaces of affine connection of the first type
由: Glebova M. V., et al.
出版: (2024-01-01)

Depth-graded motivic multiple zeta values
由: Brown, F
出版: (2021)

Cyclic elements in semisimple lie algebras
由: Elashvili, A. G., et al.
出版: (2015)

Zeta functions of simple algebras /
由: 462204 Godement, Roger, et al.
出版: (1972)

tt-geometry of Tate motives over algebraically closed fields
由: Gallauer, M
出版: (2019)

Genus two curves with full √3-level structure and Tate-Shafarevich groups
由: Bruin, N, et al.
出版: (2023)

On dimension of Lie Algebras and nilpotent Lie algebras
由: Homayoon Arabyani
出版: (2022-02-01)

Infinitesimal calculus /
由: Dieudonne, Jean Alexandre, 1906-
出版: (1971)

Infinitesimal calculus /
由: 209317 Henle, James M., et al.
出版: (1979)

Indivisibles and infinitesimals /
出版: (1974)

SEMISIMPLE CYCLIC ELEMENTS IN SEMISIMPLE LIE ALGEBRAS
由: ELASHVILI, AG, et al.
出版: (2021)

On infinitesimal transformations of Weil bundles as solutions of differential equation for Lie derivative of complete lift connection
由: Konstantin M. Budanov
出版: (2024-06-01)

Fundamentals with elements of algebra /
由: 273217 Cass, Patricia J., et al.
出版: (1998)

Zeta functions : an introduction to algebraic geometry /
由: 190181 Thomas Alan David
出版: (1977)

Lie groups lie algebras/
由: 185532 Hausner, Melvin, et al.
出版: (1968)

On Isoclinic Extensions of Lie Algebras and Nilpotent Lie Algebras
由: Arabyani Homayoon, et al.
出版: (2021-05-01)

Normal forms of nilpotent elements in semisimple Lie algebras
由: Jibladze, Mamuka, et al.
出版: (2022)

Lie algebras /
由: 183642 Wan Zhe-Xian
出版: (1975)

Lie algebras /
由: Stewart, Ian, 1945-
出版: (1970)

Approximations and infinitesimals [filem]
出版: ([19-)

Approximations and infinitesimals [kasetvideo]
出版: ([19-)

The infinitesimal model with dominance
由: Barton, NH, et al.
出版: (2023)

Foundations of infinitesimal calculus /
由: 404540 Keisler, H. Jerome
出版: (1976)

The origins of the infinitesimal calculus /
由: 379191 Baron, Margaret E.
出版: (1969)

Summation of infinitesimal quantities /
由: 239331 Natanson, I.
出版: (1961)

Introduction to the theory of infinitesimals /
由: 312946 Stroyan, K. D., et al.
出版: (1976)

Peano and the Debate on Infinitesimals
由: Paolo Freguglia
出版: (2021-02-01)

Infinitesimal Structure of Singularities
由: Michael Heller, et al.
出版: (2017-02-01)

Elements of the theory of algebraic curves/
由: 444726 Seidenberg, Abraham
出版: (1968)

Schur-Weyl duality for infinitesimal q-Schur algebras s(q)(2, r)(1)
由: Erdmann, K, et al.
出版: (2008)