The Woods–Erdös conjecture for polynomial rings

This paper solves a long-standing open question: it is known that, if R is a Noetherian ring such that R X is catenarian, then so is R X Y , and, hence, R is universally catenarian; yet the non-Noetherian case remains unsolved. We do provide here an answer with a two-dimensional coequidimensional co

R ---\* R is even, and "smooth," and of faster than polynomial growth at infinity. For example, we consider Q(x) = exp k/(]xla), a > 1, where expk = exp(exp(.., exp(... ))) denotes the k th iterated exponential. Weights of the form W 2 for such W are often called ErdSs weights. We compute the growth

We prove the following result: For every two natural numbers n and q, n ~> q + 2, there is a natural number E(n, q) satisfying the following: (1) Let S be any set of points in the plane, no three on a line. If lSl ~> E(n, q), then there exists a convex n-gon whose points belong to S, for which the