Bivariate Function Spaces and the Embedding of Their Marginal Spaces

Intersection formulae are central to the development of subdifferential calculus and the differentiation of marginal functions. In this paper, we reexamine the connection between independence conditions and intersection formulae. Then we apply the formulae to a general parametric mathematical progra

## Abstract If __ϕ__ is a positive function defined in [0, 1) and 0 < __p__ < ∞, we consider the space ℒ︁(__p__, __ϕ__) which consists of all functions __f__ analytic in the unit disc 𝔻 for which the integral means of the derivative __M__ ~__p__~ (__r__, __f__ ′) = $ \left ({\textstyle {{1} \over {

We review 28 uniform partitions of 3-space in order to find out which of them have graphs (skeletons) embeddable isometrically (or with scale 2) into some cubic lattice Z n . We also consider some relatives of those 28 partitions, including Archimedean 4-polytopes of Conway-Guy, non-compact uniform