Add to ORKGAbstract. In this paper we examine the topology of inverse limit spaces generated by maps of finite graphs. In particular we explore the way in which the structure of the orbits of the turning points affects the inverse limit. We show that if f has finitely many turning points each on a finite orbit then the inverse limit of f is determined by the number of elements in the ω-limit set of each turning point. We go on to identify the local structure of the inverse limit space at the points that correspond to points in the ω-limit set of f when the turning points of f are not necessarily on a finite orbit. This leads to a new result regarding inverse limits of maps of the interval. 1
AbstractThe results of this paper relate the dynamics of a continuous map ƒ of the circle and the to...
AbstractIn this paper we address a problem posed by W. Lewis at the Second International Conference ...
AbstractInverse limit spaces of one-dimensional continua frequently appear as attractors in dissipat...
AbstractIf ƒ is a map of a finite tree T having a dense orbit, then ƒ is chaotic. Also, if ƒ has a d...
If ƒ is a map of a finite tree T having a dense orbit, then ƒ is chaotic. Also, if ƒ has a dense orb...
AbstractThe results of this paper relate the dynamics of a continuous map ƒ of the circle and the to...
AbstractLet f:G→G be a strictly piecewise monotone continuous map on a finite graph G. By investigat...
The results of this paper relate the dynamics of a continuous map ƒ of the circle and the topology o...
AbstractInverse limit spaces of one-dimensional continua frequently appear as attractors in dissipat...
AbstractIn this paper we classify the inverse limit spaces of tent maps with a strictly preperiodic ...
AbstractWe work within the one-parameter family of symmetric tent maps, where the slope is the param...
AbstractIn this paper we classify the inverse limit spaces of tent maps with a strictly preperiodic ...
AbstractLet G be a graph and f:G→G be continuous. Denote by P(f), P(f)¯, ω(f) and Ω(f) the set of pe...
AbstractWe work within the one-parameter family of symmetric tent maps, where the slope is the param...
Let G be a graph and f:G → G be continuous. Denote by P(f), P(f), ω(f) and Ω(f) the set of periodic ...
AbstractThe results of this paper relate the dynamics of a continuous map ƒ of the circle and the to...
AbstractIn this paper we address a problem posed by W. Lewis at the Second International Conference ...
AbstractInverse limit spaces of one-dimensional continua frequently appear as attractors in dissipat...
AbstractIf ƒ is a map of a finite tree T having a dense orbit, then ƒ is chaotic. Also, if ƒ has a d...
If ƒ is a map of a finite tree T having a dense orbit, then ƒ is chaotic. Also, if ƒ has a dense orb...
AbstractThe results of this paper relate the dynamics of a continuous map ƒ of the circle and the to...
AbstractLet f:G→G be a strictly piecewise monotone continuous map on a finite graph G. By investigat...
The results of this paper relate the dynamics of a continuous map ƒ of the circle and the topology o...
AbstractInverse limit spaces of one-dimensional continua frequently appear as attractors in dissipat...
AbstractIn this paper we classify the inverse limit spaces of tent maps with a strictly preperiodic ...
AbstractWe work within the one-parameter family of symmetric tent maps, where the slope is the param...
AbstractIn this paper we classify the inverse limit spaces of tent maps with a strictly preperiodic ...
AbstractLet G be a graph and f:G→G be continuous. Denote by P(f), P(f)¯, ω(f) and Ω(f) the set of pe...
AbstractWe work within the one-parameter family of symmetric tent maps, where the slope is the param...
Let G be a graph and f:G → G be continuous. Denote by P(f), P(f), ω(f) and Ω(f) the set of periodic ...
AbstractThe results of this paper relate the dynamics of a continuous map ƒ of the circle and the to...
AbstractIn this paper we address a problem posed by W. Lewis at the Second International Conference ...
AbstractInverse limit spaces of one-dimensional continua frequently appear as attractors in dissipat...