The syntomic regulator for K4 of curves

Amnon Besser; Rob de Jeu

doi:10.2140/pjm.2012.260.305

The syntomic regulator for K₄ of curves

Amnon Besser, Rob de Jeu

Department of Mathematics

Research output: Contribution to journal › Article › peer-review

7 Scopus citations

Abstract

Let C be a curve defined over a complete discrete valuation subfield of Cp. Assuming that C has good reduction over the residue field, we compute the syntomic regulator on a certain part of K⁽³⁾ ₄ (C). The result can be expressed in terms of p-adic polylogarithms and Coleman integration. We also compute the syntomic regulator on a certain part of K⁽³⁾ ₄ (F) or the function field F of C. The result can be expressed in terms of p-adic polylogarithms and Coleman integration, or byusing a trilinear map ("triple index") on certain functions.

Original language	English
Pages (from-to)	305-380
Number of pages	76
Journal	Pacific Journal of Mathematics
Volume	260
Issue number	2
DOIs	https://doi.org/10.2140/pjm.2012.260.305
State	Published - 1 Dec 2012

Keywords

Algebraic K-theory
Syntomic regulator
p-adic polylogarithm

ASJC Scopus subject areas

Mathematics (all)

Access to Document

10.2140/pjm.2012.260.305

Cite this

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AB - Let C be a curve defined over a complete discrete valuation subfield of Cp. Assuming that C has good reduction over the residue field, we compute the syntomic regulator on a certain part of K(3) 4 (C). The result can be expressed in terms of p-adic polylogarithms and Coleman integration. We also compute the syntomic regulator on a certain part of K(3) 4 (F) or the function field F of C. The result can be expressed in terms of p-adic polylogarithms and Coleman integration, or byusing a trilinear map ("triple index") on certain functions.

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