Flux-limited solutions and state constraints for quasi-convex Hamilton-Jacobi equations

Previous research work has developed tools that provide users with more effective notice and choice [9, 18, 19, 31]. With increasing concerns about privacy because of AI, some

We introduce a subclass of starlike functions which extends the well-known class of alpha-convex functions (Mocanu functions) and the class of convex functions.. AMS 2000

We define a partition of the set of integers k in the range [1, m−1] prime to m into two or three subsets, where one subset consists of those integers k which are < m/2,

Intuitively, wherever the gradient of a function u is small, the function will be Lipschitz, so we should not need any further information from the equation at those points in order

Dans cette note, on discute une classe d’´ equations de Hamilton-Jacobi d´ ependant du temps, et d’une fonction inconnue du temps choisie pour que le maximum de la solution de

State transfer faults may also be masked, though to mask a state transfer fault in some local transition t of M i it is necessary for M to be in a global state that leads to one or

Using Theorem 3.2 and the proposition above we obtain the following corollary which is reminiscent of Montel’s theorem for holomorphic func-.

In Albano-Cannarsa [1] the authors proved that, under some condi- tions, the singularities of the semiconcave viscosity solutions of the Hamilton- Jacobi equation propagate