The following pages link to R. Labarca (Q192056):
Displaying 20 items.
- On the characterization of the kneading sequences associated to injective Lorenz maps of the interval and to orientation preserving homeomorphisms of the circle. (Q423998) (← links)
- A characterization of the kneading sequences associated to Lorenz maps of the interval (Q692747) (← links)
- Essential dynamics for Lorenz maps on the real line and the lexicographical world (Q850172) (← links)
- The explosion of singular cycles (Q1324082) (← links)
- A formula for the boundary of chaos in the lexicographical scenario and applications to the bifurcation diagram of the standard two parameter family of quadratic increasing-increasing Lorenz maps (Q1661030) (← links)
- A note on the topological classification of Lorenz maps on the interval (Q2711287) (← links)
- Bifurcation of the essential dynamics of Lorenz maps and applications to Lorenz-like flows: Contributions to the study of the expanding case (Q2758176) (← links)
- Combinatorial Dynamics and an Elementary Proof of the Continuity of the Topological Entropy at θ =101, in the Milnor Thurston World (Q2874813) (← links)
- On bifurcation sets for symbolic dynamics in the Milnor-Thurston world (Q2909787) (← links)
- BIFURCATION OF THE ESSENTIAL DYNAMICS OF LORENZ MAPS ON THE REAL LINE AND THE BIFURCATION SCENARIO FOR LORENZ LIKE FLOWS: THE CONTRACTING CASE (Q3009506) (← links)
- A computer verification for the value of the Topological Entropy for some special subshifts in the Lexicographical Scenario (Q3295222) (← links)
- (Q3412735) (← links)
- (Q3413853) (← links)
- (Q4449139) (← links)
- (Q4454838) (← links)
- (Q4541939) (← links)
- Bifurcation of contracting singular cycles (Q4886677) (← links)
- (Q5275095) (← links)
- ON THE BOUNDARY OF TOPOLOGICAL CHAOS FOR THE MILNOR–THURSTON WORLD (Q5850776) (← links)
- Bifurcation of discontinuous maps of the interval and palindromic numbers (Q5938594) (← links)