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201 results on '"Skau, Christian"'

1. $Z^{d}$-odometers and cohomology

Author

Giordano, Thierry, Putnam, Ian F., and SKau, Christian F.

Subjects
Mathematics - Dynamical Systems, 37B99, 37C85, 20J06
Abstract

Cohomology for actions of free abelian groups on the Cantor set has (when endowed with an order structure) provided a complete invariance for orbit equivalence. In this paper, we study a particular class of actions of such groups called odometers (or profinite actions) and investigate their cohomology. We show that for a free, minimal $\Z^{d}$-odometer, the first cohomology group provides a complete invariant for the action up to conjugacy. This is in contrast with the situation for orbit equivalence where it is the cohomology in dimension $d$ which provides the invariant. We also consider classification up to isomorphism and continuous orbit equivalence., Comment: 33 pages

Published
2017

2. Abel interview 2024: Michel Talagrand.

Author

Ian Dundas, Bjørn and Skau, Christian F.

Subjects
LAW of large numbers, QUANTUM field theory, SECONDARY school teachers, HIGH school teachers, ZETA functions, ISOPERIMETRIC inequalities, HAMILTON-Jacobi equations
Abstract

The article features an interview with mathematician Michel Talagrand, who won the Abel Prize in 2024 for his work in probability theory. Talagrand shares insights on his childhood, health challenges, and career achievements, including his contributions to Gaussian processes and concentration of measure phenomenon. He emphasizes the importance of humility and open-mindedness in research and discusses his plans to establish a mathematical prize. The text also mentions Talagrand's interest in running marathons and visiting museums, as well as a new book on statistical mechanics of mean-field disordered systems. [Extracted from the article]

Published
2024
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4. Orbit equivalence for Cantor minimal Z^d-systems

Author

Giordano, Thierry, Matui, Hiroki, Putnam, Ian F., and Skau, Christian F.

Subjects
Mathematics - Dynamical Systems, 37B05
Abstract

We show that every minimal action of any finitely generated abelian group on the Cantor set is (topologically) orbit equivalent to an AF relation. As a consequence, this extends the classification up to orbit equivalence of minimal dynamical systems on the Cantor set to include AF relations and Z^d-actions., Comment: 48 pages. Minor changes

Published
2008
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5. Substitutional dynamical systems, Bratteli diagrams and dimension groups

Author

Durand, Fabien, Host, Bernard, and Skau, Christian

Subjects
Mathematics - Dynamical Systems, 46L55
Abstract

The present paper explores substitution minimal systems and their relation to stationary Bratteli diagrams and stationary dimension groups. The constructions involved are algorithmic and explicit, and render an effective method to compute an invariant of (ordered) $K$-theoretic nature for these systems. This new invariant is independent of spectral invariants which have previously been extensively studied. Before we state the main results we give some background.

Published
2008

6. The absorption theorem for affable equivalence relations

Author

Giordano, Thierry, Matui, Hiroki, Putnam, Ian F., and Skau, Christian F.

Subjects
Mathematics - Dynamical Systems, Mathematics - Operator Algebras, 37B05
Abstract

We prove a result about extension of a minimal AF-equivalence relation R on the Cantor set X, the extension being `small' in the sense that we modify R on a thin closed subset Y of X. We show that the resulting extended equivalence relation S is orbit equivalent to the original R, and so, in particular, S is affable. Even in the simplest case--when Y is a finite set--this result is highly non-trivial. The result itself--called the absorption theorem--is a powerful and crucial tool for the study of the orbit structure of minimal Z^n-actions on the Cantor set [GMPS]. The absorption theorem is a significant generalization of the main theorem proved in [GPS2]. However, we shall need a few key results from [GPS2] in order to prove the absorption theorem.

Published
2007

7. Orbit equivalence for Cantor minimal Z^2-systems

Author

Giordano, Thierry, Matui, Hiroki, Putnam, Ian F., and Skau, Christian F.

Subjects
Mathematics - Dynamical Systems, Mathematics - Operator Algebras, 37B05
Abstract

We show that every minimal, free action of the group Z^2 on the Cantor set is orbit equivalent to an AF-relation. As a consequence, this extends the classification of minimal systems on the Cantor set up to orbit equivalence to include AF-relations, Z-actions and Z^2-actions., Comment: 42 pages

Published
2006

42. Zd-odometers and cohomology

Author

Giordano, Thierry, Putnam, Ian F., and Skau, Christian Fredrik

Subjects
Mathematics::Dynamical Systems, Mathematics::Algebraic Topology
Abstract

Cohomology for actions of free abelian groups on the Cantor set has (when endowed with an order structure) provided a complete invariant for orbit equivalence. In this paper, we study a particular class of actions of such groups called odometers (or profinite actions) and investigate their cohomology. We show that for a free, minimal Zd-odometer, the first cohomology group provides a complete invariant for the action up to conjugacy. This is in contrast with the situation for orbit equivalence where it is the cohomology in dimension d which provides the invariant. We also consider classification up to isomorphism and continuous orbit equivalence. © 2019. This is the authors' accepted and refereed manuscript to the article. The final authenticated version is available online at: http://dx.doi.org/10.4171/GGD/509

Published
2019

46. Interview with M. Gromov

Author

Raussen, Martin Hubert and Skau, Christian

Abstract

This interview is a Chinese translation of: Interview with Mikhail Gromov Raussen, M. & Skau, C. 2010 In : American Mathematical Society. Notices. 57, 3, p. 391-403 13 p.

Published
2018

47. Interview with Abel Laureate Sir Andrew J. Wiles

Author

Raussen, Martin Hubert and Skau, Christian

Abstract

Andrew J. Wiles is the recipient of the 2016 Abel Prize of the Norwegian Academy of Science and Letters. The interview was conducted by Martin Raussen And Christian Skau in Oslo on May 23, 2016, in conjunction with the Abel Prize celebration.

Published
2017

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