Bounds for the Postulation Numbers of Hilbert Functions

We give explicit upper bounds for residues at s=1 of Dedekind zeta functions of number fields, for |L(1, /)| for nontrivial primitive characters / on ray class groups, and for relative class numbers of CM fields. We also give explicit lower bounds for relative class numbers of CM fields (which do no

Let Γq (0 < q = 1) be the q -gamma function and let s ∈ (0, 1) be a real number. We determine the largest number α = α(q, s) and the smallest number β = β(q, s) such that the inequalities hold for all positive real numbers x. Our result refines and extends recently published inequalities by Ismail

Some natural upper bounds for the number of blocks are given. Only a few block sets achieving the bounds except trivial ones are known. Necessary conditions for the existence of such block sets are given.

## Improved Bounds for Taylor Coefficients of Analytic Functions The practical computation of verified bounds for Taylor coefficients of analytic functions is considered. Using interval arithmetic, the bounds are constructed from Cauchy's estimate and from some of its modifications. By employing t