Hostname: page-component-848d4c4894-m9kch Total loading time: 0 Render date: 2024-05-06T09:20:44.650Z Has data issue: false hasContentIssue false
  • English
  • Français

An extended version of additive K-theory

Published online by Cambridge University Press:  14 November 2008

Stavros Garoufalidis
Stavros Garoufalidis
Affiliation:
stavros@math.gatech.eduhttp://www.math.gatech.edu/~stavrosSchool of MathematicsGeorgia Institute of TechnologyAtlanta, GA 30332-0160USA
Get access

Abstract

There are two infinitesimal (i.e., additive) versions of the K-theory of a field F: one introduced by Cathelineau, which is an F-module, and the other introduced by Bloch-Esnault, which is an F*-module. Both versions are equipped with a regulator map, when F is the field of complex numbers.

We will introduce an extended version of Cathelineau's group, and a complex-valued regulator map given by the entropy. We will also give a comparison map between our extended version and Cathelineau's group.

Our results were motivated by two unrelated sources: Neumann's work on the extended Bloch group (which is isomorphic to indecomposable K3 of the complex numbers), and the study of singularities of generating series of hypergeometric multisums.

Keywords

infinitesimal K-theoryadditive K-theoryregulatorsentropy4-term relationStirling formulabinomial coefficientsinfinitesimal polylogarithmsBloch groupextended Bloch group
Type
Research Article
Information
Journal of K-Theory , Volume 4 , Issue 2 , October 2009 , pp. 391 - 403
Copyright
Copyright © ISOPP 2009

Access options

Get access to the full version of this content by using one of the access options below. (Log in options will check for institutional or personal access. Content may require purchase if you do not have access.)

References

AD.Aczél, J. and Dhombres, J., Functional equations in several variables, Encyclopedia of Mathematics and its Applications 31 Cambridge University Press, Cambridge, 1989Google Scholar
BD.Beilinson, A. and Deligne, P., Interprétation motivique de la conjecture de Zagier reliant polylogarithmes et régulateurs, in Motives, Proc. Sympos. Pure Math. 55, Part 2, (1994) 97121CrossRefGoogle Scholar
BE.Bloch, S. and Esnault, H., The additive dilogarithm, in Kazuya Kato's fiftieth birthday. Doc. Math. (2003) Extra Vol. 131155Google Scholar
Ca1.Cathelineau, J.L., Remarques sur les différentielles des polylogarithmes uniformes, Ann. Inst. Fourier 46 (1996) 13271347CrossRefGoogle Scholar
Ca2.Cathelineau, J.L., Infinitesimal polylogarithms, multiplicative presentations of Kaehler differentials and Goncharov complexes, talk at the workshop on Polylogarithms, Essen, 05 14Google Scholar
Da.Daróczy, Z., Generalized information functions, Information and Control 16 (1970) 3651CrossRefGoogle Scholar
DZ.Dupont, J.L. and Zickert, C., A dilogarithmic formula for the Cheeger-Chern- Simons class, Geom. Topol. 10 (2006) 13471372CrossRefGoogle Scholar
E-VG.Elbaz-Vincent, P. and Gangl, H., On poly(ana)logs. I, Compositio Math. 130 (2002) 161210CrossRefGoogle Scholar
Ga1.Garoufalidis, S., q-terms, singularities and the extended Bloch group, preprint 2007 arXiv:0708.0018Google Scholar
Ga2.Garoufalidis, S., An ansatz for the asymptotics of hypergeometric multisums, Adv. Applied Math., in pressGoogle Scholar
GZ.Goette, S. and Zickert, C., The Extended Bloch Group and the Cheeger-Chern- Simons Class, Geom. Topol. 11 (2007) 16231635CrossRefGoogle Scholar
O.Olver, F., Asymptotics and special functions, Reprint. AKP Classics. A K Peters, Ltd., Wellesley, MA, 1997Google Scholar
Ne.Neuman, W.D., Extended Bloch group and the Cheeger-Chern-Simons class, Geom. Topol. 8 (2004) 413474CrossRefGoogle Scholar
Za.Zagier, D., Polylogarithms, Dedekind zeta functions and the algebraic K-theory of fields, in Arithmetic algebraic geometry, Progr. Math. 89 (1991) 391430CrossRefGoogle Scholar