Continued fractions, modular symbols, and non-commutative geometry
Y. Manin, and M. Marcolli. (2001)cite arxiv:math/0102006
Comment: AMS-TeX, 50 pages, 2 figures (eps).
Abstract
Using techniques introduced by D. Mayer, we prove an extension of the
classical Gauss-Kuzmin theorem about the distribution of continued fractions,
which in particular allows one to take into account some congruence properties
of successive convergents. This result has an application to the Mixmaster
Universe model in general relativity. We then study some averages involving
modular symbols and show that Dirichlet series related to modular forms of
weight 2 can be obtained by integrating certain functions on real axis defined
in terms of continued fractions. We argue that the quotient
$PGL(2,Z)\setminusP^1(R)$ should be considered as
non-commutative modular curve, and show that the modular complex can be seen as
a sequence of $K_0$-groups of the related crossed-product $C^*$-algebras.
This paper is an expanded version of the previous "On the distribution of
continued fractions and modular symbols". The main new features are Section 4
on non-commutative geometry and the modular complex and Section 1.2.2 on the
Mixmaster Universe.
Description
Continued fractions, modular symbols, and non-commutative geometry
%0 Generic
%1 Manin2001
%A Manin, Yuri I.
%A Marcolli, Matilde
%D 2001
%K commutative continued fractions modular symbols
%T Continued fractions, modular symbols, and non-commutative geometry
%U http://arxiv.org/abs/math/0102006
%X Using techniques introduced by D. Mayer, we prove an extension of the
classical Gauss-Kuzmin theorem about the distribution of continued fractions,
which in particular allows one to take into account some congruence properties
of successive convergents. This result has an application to the Mixmaster
Universe model in general relativity. We then study some averages involving
modular symbols and show that Dirichlet series related to modular forms of
weight 2 can be obtained by integrating certain functions on real axis defined
in terms of continued fractions. We argue that the quotient
$PGL(2,Z)\setminusP^1(R)$ should be considered as
non-commutative modular curve, and show that the modular complex can be seen as
a sequence of $K_0$-groups of the related crossed-product $C^*$-algebras.
This paper is an expanded version of the previous "On the distribution of
continued fractions and modular symbols". The main new features are Section 4
on non-commutative geometry and the modular complex and Section 1.2.2 on the
Mixmaster Universe.
@misc{Manin2001,
abstract = { Using techniques introduced by D. Mayer, we prove an extension of the
classical Gauss-Kuzmin theorem about the distribution of continued fractions,
which in particular allows one to take into account some congruence properties
of successive convergents. This result has an application to the Mixmaster
Universe model in general relativity. We then study some averages involving
modular symbols and show that Dirichlet series related to modular forms of
weight 2 can be obtained by integrating certain functions on real axis defined
in terms of continued fractions. We argue that the quotient
$PGL(2,\bold{Z})\setminus\bold{P}^1(\bold{R})$ should be considered as
non-commutative modular curve, and show that the modular complex can be seen as
a sequence of $K_0$-groups of the related crossed-product $C^*$-algebras.
This paper is an expanded version of the previous "On the distribution of
continued fractions and modular symbols". The main new features are Section 4
on non-commutative geometry and the modular complex and Section 1.2.2 on the
Mixmaster Universe.
},
added-at = {2010-11-29T17:51:41.000+0100},
author = {Manin, Yuri I. and Marcolli, Matilde},
biburl = {https://www.bibsonomy.org/bibtex/2975fc0784168d1138b35b9925348fdc3/uludag},
description = {Continued fractions, modular symbols, and non-commutative geometry},
interhash = {f29c120ee64fead0b1c771b311f8764c},
intrahash = {975fc0784168d1138b35b9925348fdc3},
keywords = {commutative continued fractions modular symbols},
note = {cite arxiv:math/0102006
Comment: AMS-TeX, 50 pages, 2 figures (eps)},
timestamp = {2010-11-29T17:51:41.000+0100},
title = {Continued fractions, modular symbols, and non-commutative geometry},
url = {http://arxiv.org/abs/math/0102006},
year = 2001
}