Infinite Dimensional Analysis || Convexity

One way to approach infinite-dimensional nonlinear programs is to append increasingly large cost or penalty terms to the objective function in such a way that the minima of the augmented but unconstrained functions converge to the constrained minimum in the limit. In this paper we establish the conv

We generalize Talagrand's inequality in the theory of optimal transport and give some applications of our result. In particular, we establish an estimate for a couple of transportation mappings. In the finite-dimensional case we obtain a new log-Sobolev type inequality. In the infinite-dimensional c

In this paper we generalize the linear Kostant Convexity Theorem to Lie algebras of bounded linear operators on a Hilbert space: If t is a Cartan subspace of one of the hermitian real forms h(H), ho(I c ), hsp(I a ), p t is the projection on t, U the corresponding unitary group and W the correspondi