Several Relations on the Class of Ordinal Numbers

The analogues of the classical Kronecker and Hurwitz class number relations for function fields of any positive characteristic are obtained by a method parallel to the classical proof. In the case of even characteristic, purely inseparable orders also have to be taken into account. A subtle point is

## Abstract We introduce several variations of the Turan and Ramsey numbers, including zero‐sum and bounded‐average Ramsey numbers. Some interesting relations between these concepts are presented. In particular, a generalization of the __k__‐local Ramsey numbers is established.

## Abstract We study the structure of Σ^1^~1~ equivalence relations on hyperarithmetical subsets of ω under reducibilities given by hyperarithmetical or computable functions, called h‐reducibility and FF‐reducibility, respectively. We show that the structure is rich even when one fixes the number o

## Abstract The theorem that the arithmetic mean is greater than or equal to the geometric mean is investigated for cardinal and ordinal numbers. It is shown that whereas the theorem of the means can be proved for __n__ pairwise comparable cardinal numbers without the axiom of choice, the inequalit

## Abstract The cochromatic number of a graph __G__, denoted by __z__(__G__), is the minimum number of subsets into which the vertex set of __G__ can be partitioned so that each subset induces an empty or a complete subgraph of __G__. In an earlier work, the author considered the problem of determi