The number of generators of a colength N ideal in a power series ring

Let µ I denote the minimal number of generators of an ideal I of a local ring R M . The Dilworth number d R = max µ I I an ideal of R and Sperner number sp R = max µ M i i ≥ 0 are determined in the case that R = A G , where G = Z/pZ k is an elementary abelian p-group, A zA is a principal local ring

It is known that the powers ᒊ n of the maximal ideal of a local Noetherian ring share certain homological properties for all sufficiently large integers n. For example, the natural homomorphisms R ª Rrᒊ n are Golod, respectively, small, for all large n. We give effective bounds on the smallest integ

Given a local ring R and n ideals whose sum is primary to the maximal ideal of Ž . R, one may define a function which takes an n-tuple of exponents a , . . . , a to 0 1 2 1 2 although this has not yet proved possible. We are, however, able to establish certain properties of the functions f in some g