The shift equivalence problem

Kim, K.H.; Roush, F.W.
September 1999
Mathematical Intelligencer;Fall99, Vol. 21 Issue 4, p18
Academic Journal
Examines the use of shift equivalence theory for subshifts of finite type in algebraic problems. Difference between shift equivalence and strong shift equivalence theory; Discussion on the counter examples using sgc2; Relationship among strong shift equivalence, algebraic K-theory, and topological quantum theory.


Related Articles

  • Quantum Weighted Projective and Lens Spaces. D'Andrea, Francesco; Landi, Giovanni // Communications in Mathematical Physics;Nov2015, Vol. 340 Issue 1, p325 

    We generalize to quantum weighted projective spaces in any dimension previous results of us on K-theory and K-homology of quantum projective spaces 'tout court'. For a class of such spaces, we explicitly construct families of Fredholm modules, both bounded and unbounded (that is, spectral...

  • A Hopf Bundle Over a Quantum Four-Sphere from the Symplectic Group. Landi, Giovanni; Pagani, Chiara; Reina, Cesare // Communications in Mathematical Physics;Mar2006, Vol. 263 Issue 1, p65 

    We construct a quantum version of the SU(2) Hopf bundle S 7→ S 4. The quantum sphere S 7 q arises from the symplectic group Sp q (2) and a quantum 4-sphere S 4 q is obtained via a suitable self-adjoint idempotent p whose entries generate the algebra A(S 4 q ) of polynomial...

  • KAG volume 13 issue 2 Cover and Back matter.  // Journal of K -- Theory;Apr2014, Vol. 13 Issue 2, pb1 

    The back page of the issue two, volume 13 of the journal "Journal of K-Theory: K-Theory and its Applications in Algebra, Geometry, Analysis & Topology" is presented.

  • KAG volume 11 issue 1 Cover and Back matter.  // Journal of K -- Theory;Feb2013, Vol. 11 Issue 1, pb1 

    A table of contents for the issue is presented.

  • Finite dimensional irreducible representations of the quantum algebra Uq(C2). Yang, Yaping; Yu, Zurong // Journal of Mathematical Physics;Feb94, Vol. 35 Issue 2, p1037 

    In this article, the communtation relations of the generators of quantum algebra Uq(C2) are analyzed and irreducible q-tensor operators of rank (1/2) of quantum algebra SUq(2) are constructed. By means of the property of a q-tensor operator, finite irreducible representations of Uq(C2) can be...

  • Deformation map and Hermitian representations of k-Poincaré algebra. Maslanka, Paweł // Journal of Mathematical Physics;Dec93, Vol. 34 Issue 12, p6025 

    A deformation map from the classical to the deformed Poincaré algebra is given. The Hermitian representations of deformed algebra corresponding to all orbits in p space are explicitly constructed.

  • On Reichenbach's common cause principle and Reichenbach's notion of common cause. Hofer-Szabo, Gabor; Redei, Miklos // British Journal for the Philosophy of Science;Sep99, Vol. 50 Issue 3, p377 

    Focuses on Reichenbach's Common Cause Principle and notion of common cause. Completability of common cause; Investigation of the principle; Utilization of the Boolean algebra; Proofs of the propositions.

  • On Probabilistic Quantum Thinking. Tarlaci, Sultan // NeuroQuantology;Dec2010 Supplement 1, Vol. 8, pS1 

    An introduction to the journal is presented in which the editor discusses various issues including derivation of quantum mechanics by Clifford algebra, quantum mechanics (QM), and quantum physics.

  • Highest weight irreducible unitary representations of Lie algebras of infinite matrices. I. The algebra gl(∞). Palev, Tchavdar D. // Journal of Mathematical Physics;Mar1990, Vol. 31 Issue 3, p579 

    Two classes of irreducible highest weight modules of the general linear Lie algebra gl(∞), corresponding to two different Borel subalgebras, are constructed. Both classes contain all unitary representations. Within each module a basis is introduced. Expressions for the transformation of the...


Read the Article


Sorry, but this item is not currently available from your library.

Try another library?
Sign out of this library

Other Topics