On the cardinality of lower sets and universal discretization

Abstract

A set Q in Z+d is a lower set if (k1,…,kd)∈ Q implies (l1,…,ld)∈ Q whenever 0 li ki for all i. We derive new and refine known results regarding the cardinality of the lower sets of size n in Z+d. Next we apply these results for universal discretization of the L2-norm of elements from n-dimensional subspaces of trigonometric polynomials generated by lower sets.