On a theorem of K. Schmidt

We prove a version of the Krull-Schmidt theorem which applies to Noetherian modules. As a corollary we get the following cancellation rule: then there are modules A ≤ A and B ≤ B such that A ∼ = B and len A = len A = len B = len B. Here the ordinal valued length, len A, of a module A is as defined

A min-max property of bipartite graphs is stated; it is a variation on the theorem of Kiinig 'maximum x%zhing= minimum covering'; one shows that a c&&i inequaliw holds for any graph and the equality for bipartite graphs is derived from a simple network flow model. -. ## Various extensions of the t

It was recently proved by A. Granville and K. Ono that if t # N, t 4 then every natural number has a t-core partition. The essence of the proof consists in showing this assertion for t prime, t 11. We give an alternative, short proof for these cases.