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

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

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

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