Path methods for strong shift equivalence of positive matrices
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Publication:368714
DOI10.1007/s10440-013-9809-4zbMath1325.15027arXiv1209.5096OpenAlexW3099261031MaRDI QIDQ368714
Mike Boyle, Kim Hang Kim, Fred W. Roush
Publication date: 23 September 2013
Published in: Acta Applicandae Mathematicae (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1209.5096
Related Items (5)
Strong shift equivalence and the generalized spectral conjecture for nonnegative matrices ⋮ The publications of Ki Hang Kim ⋮ The work of Kim and Roush in symbolic dynamics ⋮ Strong shift equivalence and positive doubly stochastic matrices ⋮ Strong shift equivalence and algebraic \(K\)-theory
Cites Work
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- Stratified mappings - structure and triangulability
- On the distance between lattices of invariant subspaces of matrices
- Triangulation of stratified fibre bundles
- Strong shift equivalence of Boolean and positive rational matrices
- The Williams conjecture is false for irreducible subshifts
- Presentations of subshifts and their topological conjugacy invariants
- Symbolic dynamics. One-sided, two-sided and countable state Markov shifts
- Classification of subshifts of finite type
- Tangents to an analytic variety
- Path components of matrices and strong shift equivalence over \(Q^ +\)
- On strong shift equivalence over a Boolean semiring
- An algorithm for sofic shift equivalence
- Notes on Coding Problems for Finite State Processes
- Algebraic Shift Equivalence and Primitive Matrices
- Strong shift equivalence theory and the shift equivalence problem
- On strong shift equivalence of symbolic matrix systems
- Ergodic theory of equivariant diffeomorphisms: Markov partitions and stable ergodicity
- An Introduction to Symbolic Dynamics and Coding
- The weight-per-symbol polytope and scaffolds of invariants associated with Markov chains
- Equivariant flow equivalence for shifts of finite type, by matrix equivalence over group rings
- Number fields
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