Convexity of free boundaries with bernoulli type boundary condition

We study convex Hamilton-Jacobi equations H (x, Du) = 0 and u t + H (x, Du) = 0 in a bounded domain Ω of R n with the Neumann type boundary condition D γ u = g in the viewpoint of weak KAM theory, where γ is a vector field on the boundary ∂Ω pointing a direction oblique to ∂Ω. We establish the stabi

A simple and uni"ed approach is presented for the vibration analysis of a generally supported beam. The #exural displacement of the beam is sought as the linear combination of a Fourier series and an auxiliary polynomial function. The polynomial function is introduced to take all the relevant discon

## a b s t r a c t In this paper we consider shape optimization of systems, which are governed by external Bernoulli free boundary problems. A pseudo-solid approach for solving discrete free boundary problems is introduced. The solution strategy readily allows us to obtain geometrical sensitivities