CRITICAL FORCING FOR HOMOCLINIC AND HETEROCLINIC ORBITS OF A ROTATING PENDULUM

We consider an autonomous Hamiltonian system u +{V(u)=0 where the potential V : R 2 "[!] Ä R has a strict global maximum at the origin and a singularity at some point !{0. Under some compactness conditions on V at infinity and around the singularity ! we study the existence of homoclinic orbits to 0

## Abstract We consider the Hamiltonian system in IR^__N__^ given by where __V__ : IR^__N__^ rarr; IR is a smooth potential having a non degenerate local maximum at 0 and we assume that there is an open bounded neighborhood ft of 0 such that V(__x__) < __V__(0) for __x__ δ Ω / {0}, __V(x)__ = __V

Spinning disk±spindle systems consisting of an elastic disk mounted on an elastic spindle by means of a three-dimensional, rigid clamp extend the rich literature on spinning disks and spinning shafts that are decoupled from each other. This work presents an exact, closed-form solution for the eigens

## Abstract We have developed a set of restraint potentials for β‐hairpin tilt relative to the membrane normal, β‐hairpin rotation around the β‐hairpin axis, and hairpin–hairpin distance. Such restraint potentials enable us to characterize the molecular basis of specific β‐hairpin tilt and rotation