The influence of heat on the 3D-transition of the von Kármán vortex street

We build explicitly an infinite number of equilibrium solutions of unloaded Marguerre-von Kármán membrane shells. This construction is based upon the existence of three elementary solutions, together with the solution of a Monge-Ampère equation associated with a partition of the reference configurat

We prove that the one-dimensional von K~rm~n system of equations describing the planar motion of a uniform prismatic beam of length L approaches (weakly) to a nonlocal beam equation of Timoshenko's type as a suitable parameter tends to zero. (~

We consider a dynamical von Ka´rma´n system in the presence of thermal effects. Our model includes the possibility of a rotational inertia term in the system. We show that the total energy of the solution of such system decays exponentially as tP# R. The decay rates we obtain are uniform on bounded

We deal with the system of quasistationary von Kà armà an equations describing moderately large de ections of thin viscoelastic plates. We concentrate on a di erential-type material, which gives rise to a quasistationary system with a linear pseudoparabolic main part and a non-linear di erential ter