Pub: Chaotic orbits of tumbling ellipsoids

Summary
Orbits tracked by ellipsoids immersed in inviscid and viscous environments are studied by means of Kirchhoffs equations and high resolution numerical simulations using a variant of the immersed boundary method We explore the consequences of Kozlov and Onishchenkos theorem of nonintegrability of Kirchhoffs equations to show how the fraction of phase space in chaotic orbits is sensitively determined by the body shape fluidsolid density ratio and the fraction of initial energy in rotational motion We show how the added mass tensor of the system is an important player in both viscous and inviscid flow in causing chaos in a triaxial ellipsoid while acting to suppress it in a spheroid We identify a new integral of motion for a spheroid in inviscid fluid one component of the generalised angular momentum A spheroid which can never execute chaotic dynamics in inviscid flow is shown to display chaos in viscous flow due to irregular vortex shedding But the dynamics of the spheroid is restricted whether in viscous or in inviscid flow unlike in the triaxial ellipsoid due to our extra integral of motionKey words particlefluid flow chaos