A remarkable property of the (co) syzygy modules of the residue field of a nonregular local ring

This paper explicitly determines the core of a torsion-free, integrally closed module over a two-dimensional regular local ring. It is analogous to a result of Huneke and Swanson which determines the core of an integrally closed ideal. The main result asserts that the core of a finitely generated, t

Let O denote the ring of integers of a local field. In this note we prove an Ä 4 ϱ approximation theorem for the Riesz type kernels ␥ over O. The proof , , n ns1 Ž . y1 requires a sharp estimate of the Dirichlet kernel D x on P \_ O, which may also n have independent interest. As a consequence we so

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

Let O O be the ring of integers in a local field K. We solve an open problem due Ž to M. H. Taibleson 1975, ''Math. Notes,'' Vol. 15, Princeton Univ. Press, Prince-. 1 Ž . ton, NJ : Suppose f g L O O . Does the Cesaro means of f converge to f almost `Ž p p . everywhere if K has characteristic zero?