Ordered group invariants for one-dimensional spaces

Abstract: Abstract. We show that the Bruschlinsky group with the winding order is a homeomorphism invariant for a class of one-dimensional inverse limit spaces. In particular we show that if a presentation of an inverse limit space satisfies the Simplicity Condition, then the Bruschlinsky group with the winding order of the inverse limit space is a dimension group and is a quotient of the dimension group with the standard order of the adjacency matrices associated with the presentation. Introduction.Ordered groups have … Show more

“…In recent developments, ordered group invariants in C * -algebras and topological dynamics have been used to provide invariants of homeomorphisms of certain one-dimensional compact metrizable spaces ( [1], [2], [3], [6], [9], [10], [11], [16]). We can interpret these results as follows: the firstČech cohomology group of the space is given a preorder, and the isomorphism class of the resulting preordered group becomes an invariant of the homeomorphism class of the space.…”

“…Every 1-solenoid has an elementary presentation ( [14], [15]). If (X, f ) is an elementary presentation of a 1-solenoid X and M = M X,f is the adjacency matrix of f : X → X, theň H 1 (X) is isomorphic to ∆ M ( [16]). This invariant of the homeomorphism class of X was refined by Jacklitch ( [3]), who showed that if (X, f ) and (Y, g) are elementary presentations of oriented 1-solenoids X and Y , then the dimension groups…”

“…We can define a positive seť H 1 ⊕ for the winding order onȞ 1 for a large class of one-dimensional spaces, and explain the Jacklitch result as the computation of Ȟ 1 ,Ȟ 1 ⊕ for 1-solenoids ( [16]). This can also be done by analyzing the direct limit order onȞ 1 , and we can recast the arguments of [3] and [9] in this framework.…”

“…The assumption of an elementary presentation is necessary and natural. If X is orientable and elementary presented, then ∆ M X,f is order isomorphic toȞ 1 (X); but this may fail if the presentation is not elementary ( [16]). Likewise, if X is not orientable and (X, f ) is not an elementary presentation, then ∆ M X,f need not be isomorphic tǒ…”

Ordered group invariants for nonorientable one-dimensional generalized solenoids

“…In recent developments, ordered group invariants in C * -algebras and topological dynamics have been used to provide invariants of homeomorphisms of certain one-dimensional compact metrizable spaces ( [1], [2], [3], [6], [9], [10], [11], [16]). We can interpret these results as follows: the firstČech cohomology group of the space is given a preorder, and the isomorphism class of the resulting preordered group becomes an invariant of the homeomorphism class of the space.…”

“…Every 1-solenoid has an elementary presentation ( [14], [15]). If (X, f ) is an elementary presentation of a 1-solenoid X and M = M X,f is the adjacency matrix of f : X → X, theň H 1 (X) is isomorphic to ∆ M ( [16]). This invariant of the homeomorphism class of X was refined by Jacklitch ( [3]), who showed that if (X, f ) and (Y, g) are elementary presentations of oriented 1-solenoids X and Y , then the dimension groups…”

“…We can define a positive seť H 1 ⊕ for the winding order onȞ 1 for a large class of one-dimensional spaces, and explain the Jacklitch result as the computation of Ȟ 1 ,Ȟ 1 ⊕ for 1-solenoids ( [16]). This can also be done by analyzing the direct limit order onȞ 1 , and we can recast the arguments of [3] and [9] in this framework.…”

“…The assumption of an elementary presentation is necessary and natural. If X is orientable and elementary presented, then ∆ M X,f is order isomorphic toȞ 1 (X); but this may fail if the presentation is not elementary ( [16]). Likewise, if X is not orientable and (X, f ) is not an elementary presentation, then ∆ M X,f need not be isomorphic tǒ…”

Ordered group invariants for nonorientable one-dimensional generalized solenoids

“…Apart from the matter of canonical symbolic dynamics, we mention renewed interest in Williams' systems and related systems on account of connections with ordered group invariants ( [3,12,18]) and substitutions and tilings ( [2,6]).…”

Zeta Functions for One-Dimensional Generalized Solenoids

The homoclinic and heteroclinic C^*-algebras of a generalized one-dimensional solenoid