On the Depth of the Associated Graded Ring of an m-Primary Ideal of a Cohen-Macaulay Local Ring

Let R be a local Cohen᎐Macaulay ring, let I be an R-ideal, and let G be the associated graded ring of I. We give an estimate for the depth of G when G fails to be Cohen᎐Macaulay. We assume that I has a small reduction number and sufficiently good residual intersection properties and satisfies local

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

## Abstract In a previous report we showed that certain binary Ag^+^–amino acid complexes formed adduct ions by the attachment of a single water and methanol molecule when stored in an ion trap mass spectrometer: complexes with aliphatic amino acids and with 4‐fluorophenylalanine formed the adduct