On a conjecture of Furusho over function fields
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Publication:2225229
DOI10.1007/s00222-020-00988-1zbMath1462.11107arXiv1710.10849OpenAlexW3043136343WikidataQ123092224 ScholiaQ123092224MaRDI QIDQ2225229
Chieh-Yu Chang, Yoshinori Mishiba
Publication date: 5 February 2021
Published in: Inventiones Mathematicae (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1710.10849
Arithmetic theory of algebraic function fields (11R58) Finite ground fields in algebraic geometry (14G15) Transcendence theory of Drinfel'd and (t)-modules (11J93) Formal groups, (p)-divisible groups (14L05) Generalizations (algebraic spaces, stacks) (14A20)
Related Items (5)
Taylor coefficients of Anderson-Thakur series and explicit formulae ⋮ On ∞-adic and v-adic multiple zeta functions in positive characteristic ⋮ On Thakur’s basis conjecture for multiple zeta values in positive characteristic ⋮ Integrality of \(v \)-adic multiple zeta values ⋮ On lower bounds of the dimensions of multizeta values in positive characteristic
Cites Work
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- Linear relations among double zeta values in positive characteristic
- On algebraic independence of certain multizeta values in characteristic \(p\)
- Tensor powers of the Carlitz module and zeta values
- Transcendence and special zeta values in characteristic p
- Power sums with applications to multizeta and zeta zero distribution for \(\mathbb F_q[t\)]
- Dilogarithms, regulators and \(p\)-adic \(L\)-functions
- Algebraische Punkte auf analytischen Untergruppen algebraischer Gruppen. (Algebraic points on analytic subgroups of algebraic groups)
- \(t\)-motives
- An addendum to ``\(v\)-adic zeta functions, \(L\)-series, and measures for function fields
- Analytic homomorphisms into Drinfeld modules
- Periods of \(t\)-motives and transcendence
- An effective criterion for Eulerian multizeta values in positive characteristic
- Determination of the algebraic relations among special \(\Gamma\)-values in positive characteristic
- \(p\)-adic multiple zeta values. I: \(p\)-adic multiple polylogarithms and the \(p\)-adic KZ equation
- Special zeta values using tensor powers of Drinfeld modules
- A rapid introduction to Drinfeld modules, \(t\)-modules, and \(t\)-motives
- Pink's theory of Hodge structures and the Hodge conjecture over function fields
- Interpolation of multiple zeta and zeta-star values
- Determination of algebraic relations among special zeta values in positive characteristic
- Tannakian duality for Anderson-Drinfeld motives and algebraic independence of Carlitz logarithms
- Multiple Zeta Functions, Multiple Polylogarithms and Their Special Values
- Linear independence of monomials of multizeta values in positive characteristic
- Shuffle Relations for Function Field Multizeta Values
- Multizeta Values for , Their Period Interpretation, and Relations between Them
- Linear independence of Gamma values in positive characteristic
- On Multiple Polylogarithms in Characteristic $p$: $v$-Adic Vanishing Versus $\infty$-Adic Eulerianness
- Relations Between Multizeta Values for
- Regularization and generalized double shuffle relations for $p$-adic multiple zeta values
- Derivation and double shuffle relations for multiple zeta values
- p -adic multiple zeta values II. Tannakian interpretations
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