Add to ORKGWe prove the existence of infinitely many periodic solutions and complicated dynamics, due to the presence of a topological horseshoe, for the classical Volterra predator-prey model with a periodic harvesting. The proof relies on some recent results about chaotic planar maps combined with the study of geometric features which are typical of linked twist maps
Inspired by a discrete-time predator-prey model we introduce a planar, noninvertible map composed of...
Inspired by a discrete-time predator-prey model we introduce a planar, noninvertible map composed of...
In this paper, we consider the dynamics of a discrete predator-prey model which is a result of discr...
Abstract. We prove the existence of innitely many periodic solutions and compli-cated dynamics, due ...
Using phase–plane analysis, findings from the theory of topological horseshoes and linked-twist maps...
We extend the concept of linked twist maps to a 3D setting and develop a global geometrical method t...
We discuss a geometric configuration for a class of homeomorphisms in producing the existence of inf...
Inspired by a discrete-time predator-prey model we introduce a planar, noninvertible map composed of...
We prove the existence of infinitely many periodic solutions, as well as the presence of chaotic dyn...
The twisted horseshoe map was developed in order to study a class of density dependent Leslie popula...
We study the dynamics of three planar, noninvertible maps which rotate and fold the plane. Two maps ...
Inspired by a discrete-time predator-prey model we introduce a planar, noninvertible map composed of...
Inspired by a discrete-time predator-prey model we introduce a planar, noninvertible map composed of...
We present a simple topological approach for the search of fixed points and the detection of chaotic...
Inspired by a discrete-time predator-prey model we introduce a planar, noninvertible map composed of...
Inspired by a discrete-time predator-prey model we introduce a planar, noninvertible map composed of...
Inspired by a discrete-time predator-prey model we introduce a planar, noninvertible map composed of...
In this paper, we consider the dynamics of a discrete predator-prey model which is a result of discr...
Abstract. We prove the existence of innitely many periodic solutions and compli-cated dynamics, due ...
Using phase–plane analysis, findings from the theory of topological horseshoes and linked-twist maps...
We extend the concept of linked twist maps to a 3D setting and develop a global geometrical method t...
We discuss a geometric configuration for a class of homeomorphisms in producing the existence of inf...
Inspired by a discrete-time predator-prey model we introduce a planar, noninvertible map composed of...
We prove the existence of infinitely many periodic solutions, as well as the presence of chaotic dyn...
The twisted horseshoe map was developed in order to study a class of density dependent Leslie popula...
We study the dynamics of three planar, noninvertible maps which rotate and fold the plane. Two maps ...
Inspired by a discrete-time predator-prey model we introduce a planar, noninvertible map composed of...
Inspired by a discrete-time predator-prey model we introduce a planar, noninvertible map composed of...
We present a simple topological approach for the search of fixed points and the detection of chaotic...
Inspired by a discrete-time predator-prey model we introduce a planar, noninvertible map composed of...
Inspired by a discrete-time predator-prey model we introduce a planar, noninvertible map composed of...
Inspired by a discrete-time predator-prey model we introduce a planar, noninvertible map composed of...
In this paper, we consider the dynamics of a discrete predator-prey model which is a result of discr...