A priori estimate for convex solutions to special Lagrangian equations and its application

We prove existence and uniform a priori estimates for tempered Gibbs states of certain classical lattice systems with unbounded spins, nonharmonic pair potentials, and infinite radius of interaction. We use an alternative characterization of Gibbs measures in terms of their Radon Nikodym derivatives

## Abstract A one‐dimensional transport test applied to some conventional advective Eulerian schemes shows that linear stability analyses do not guarantee the actual performances of these schemes. When adopting the Lagrangian approach, the main problem raised in the numerical treatment of advective

We present new decay estimates of solutions for the mixed problem of the equation vtt -vxx + vt = 0, which has the weighted initial data [v . Similar decay estimates are also derived to the Cauchy problem in R N for utt -u+ut = 0 with the weighted initial data. Finally, these decay estimates can be

Difierential Equations, and Its Application to the Study of the Local Behavior of Solutions of Elliptic Equations\* P. D. LAX -= ( D + K ( t ) ) u . dt In this paper we shall consider bounded perturbations. It turns out that if the norm of K ( t ) is not larger than the size of the gaps in the spec