Standard
Is Every Irreducible Shift of Finite Type Flow Equivalent to a Renewal System? / Johansen, Rune.
Operator Algebra and Dynamics: Nordforsk Network Closing Conference, Faroe Islands, May 2012. red. / Toke M. Clausen; Søren Eilers; Gunnar Restorff; Sergei Silvestrov. Springer, 2013. s. 187-209 (Springer Proceedings in Mathematics & Statistics , Bind 58).
Publikation: Bidrag til bog/antologi/rapport › Konferencebidrag i proceedings › Forskning › fagfællebedømt
Harvard
Johansen, R 2013,
Is Every Irreducible Shift of Finite Type Flow Equivalent to a Renewal System? i TM Clausen, S Eilers, G Restorff & S Silvestrov (red),
Operator Algebra and Dynamics: Nordforsk Network Closing Conference, Faroe Islands, May 2012. Springer, Springer Proceedings in Mathematics & Statistics , bind 58, s. 187-209.
https://doi.org/10.1007/978-3-642-39459-1_9
APA
Johansen, R. (2013).
Is Every Irreducible Shift of Finite Type Flow Equivalent to a Renewal System? I T. M. Clausen, S. Eilers, G. Restorff, & S. Silvestrov (red.),
Operator Algebra and Dynamics: Nordforsk Network Closing Conference, Faroe Islands, May 2012 (s. 187-209). Springer. Springer Proceedings in Mathematics & Statistics Bind 58
https://doi.org/10.1007/978-3-642-39459-1_9
Vancouver
Johansen R.
Is Every Irreducible Shift of Finite Type Flow Equivalent to a Renewal System? I Clausen TM, Eilers S, Restorff G, Silvestrov S, red., Operator Algebra and Dynamics: Nordforsk Network Closing Conference, Faroe Islands, May 2012. Springer. 2013. s. 187-209. (Springer Proceedings in Mathematics & Statistics , Bind 58).
https://doi.org/10.1007/978-3-642-39459-1_9
Author
Johansen, Rune. / Is Every Irreducible Shift of Finite Type Flow Equivalent to a Renewal System?. Operator Algebra and Dynamics: Nordforsk Network Closing Conference, Faroe Islands, May 2012. red. / Toke M. Clausen ; Søren Eilers ; Gunnar Restorff ; Sergei Silvestrov. Springer, 2013. s. 187-209 (Springer Proceedings in Mathematics & Statistics , Bind 58).
Bibtex
@inproceedings{f4e0b4fba9eb46dba7330b6fbab65dcd,
title = "Is Every Irreducible Shift of Finite Type Flow Equivalent to a Renewal System?",
abstract = "Is every irreducible shift of finite type flow equivalent to a renewal system? For the first time, this variation of a classic problem formulated by Adler is investigated, and several partial results are obtained in an attempt to find the range of the Bowen–Franks invariant over the set of renewal systems of finite type. In particular, it is shown that the Bowen–Franks group is cyclic for every member of a class of renewal systems known to attain all entropies realised by shifts of finite type, and several classes of renewal systems with non-trivial values of the invariant are constructed.",
author = "Rune Johansen",
year = "2013",
doi = "10.1007/978-3-642-39459-1_9",
language = "English",
isbn = "9783642394584",
series = "Springer Proceedings in Mathematics & Statistics ",
pages = "187--209",
editor = "Clausen, {Toke M.} and Eilers, {S{\o}ren } and Restorff, {Gunnar } and Silvestrov, {Sergei }",
booktitle = "Operator Algebra and Dynamics",
publisher = "Springer",
address = "Switzerland",
}
RIS
TY - GEN
T1 - Is Every Irreducible Shift of Finite Type Flow Equivalent to a Renewal System?
AU - Johansen, Rune
PY - 2013
Y1 - 2013
N2 - Is every irreducible shift of finite type flow equivalent to a renewal system? For the first time, this variation of a classic problem formulated by Adler is investigated, and several partial results are obtained in an attempt to find the range of the Bowen–Franks invariant over the set of renewal systems of finite type. In particular, it is shown that the Bowen–Franks group is cyclic for every member of a class of renewal systems known to attain all entropies realised by shifts of finite type, and several classes of renewal systems with non-trivial values of the invariant are constructed.
AB - Is every irreducible shift of finite type flow equivalent to a renewal system? For the first time, this variation of a classic problem formulated by Adler is investigated, and several partial results are obtained in an attempt to find the range of the Bowen–Franks invariant over the set of renewal systems of finite type. In particular, it is shown that the Bowen–Franks group is cyclic for every member of a class of renewal systems known to attain all entropies realised by shifts of finite type, and several classes of renewal systems with non-trivial values of the invariant are constructed.
U2 - 10.1007/978-3-642-39459-1_9
DO - 10.1007/978-3-642-39459-1_9
M3 - Article in proceedings
SN - 9783642394584
T3 - Springer Proceedings in Mathematics & Statistics
SP - 187
EP - 209
BT - Operator Algebra and Dynamics
A2 - Clausen, Toke M.
A2 - Eilers, Søren
A2 - Restorff, Gunnar
A2 - Silvestrov, Sergei
PB - Springer
ER -