Your search keyword '"Robin J. Deeley"' showing total 2 results

1. Group actions on Smale space C*-algebras

Author

Karen R. Strung and Robin J. Deeley

Subjects

Pure mathematics, Mathematics::Dynamical Systems, Applied Mathematics, General Mathematics, 010102 general mathematics, Stability (learning theory), Mathematics - Operator Algebras, Dynamical Systems (math.DS), 16. Peace & justice, Space (mathematics), 01 natural sciences, 46L35, 37D20, Group action, 0103 physical sciences, FOS: Mathematics, 010307 mathematical physics, 0101 mathematics, Mathematics - Dynamical Systems, Operator Algebras (math.OA), Mathematics

Abstract

Group actions on a Smale space and the actions induced on the C*-algebras associated to such a dynamical system are studied. We show that an effective action of a discrete group on a mixing Smale space produces a strongly outer action on the homoclinic algebra. We then show that for irreducible Smale spaces, the property of finite Rokhlin dimension passes from the induced action on the homoclinic algbera to the induced actions on the stable and unstable C*-algebras. In each of these cases, we discuss the preservation of properties---such as finite nuclear dimension, Z-stability, and classification by Elliott invariants---in the resulting crossed products., 30 pages. Final version, to appear in Ergodic Theory Dynam. Systems

Published

2020

2. The stable algebra of a Wieler solenoid: inductive limits and -theory

Author

Allan Yashinski and Robin J. Deeley

Subjects

Algebra, Operator algebra, Applied Mathematics, General Mathematics, Totally disconnected space, Spectrum (functional analysis), Solenoid, Inverse limit, Direct limit, Invariant (mathematics), Space (mathematics), Mathematics

Abstract

Wieler has shown that every irreducible Smale space with totally disconnected stable sets is a solenoid (i.e., obtained via a stationary inverse limit construction). Using her construction, we show that the associated stable $C^{\ast }$-algebra is the stationary inductive limit of a $C^{\ast }$-stable Fell algebra that has a compact spectrum and trivial Dixmier–Douady invariant. This result applies in particular to Williams solenoids along with other examples. Beyond the structural implications of this inductive limit, one can use this result to, in principle, compute the $K$-theory of the stable $C^{\ast }$-algebra. A specific one-dimensional Smale space (the $aab/ab$-solenoid) is considered as an illustrative running example throughout.

Published

2019