Lower bounds for the minimal distance in rational approximation

## For the simple binary detection problem of detecting a known signal in the presence of additive noise, the matched.filter is well known to yield the highest output signalto-noise ratio (SNR). When the detection is carried out in discrete time, selecting an optimal Jilter length for a speciJc dete

A method for the calculation of rate constants of bimolecular reactions for an arbitrary type of spherically isotropic transfer probabilities and the interaction potentials between reagents has been developed. On the basis of this method, an integral representation of upper and lower bounds for quen

We produce an absolute lower bound for the height of the algebraic numbers (different from zero and from the roots of unity) lying in an abelian extension of the rationals. The proof rests on elementary congruences in cyclotomic fields and on Kronecker Weber theorem.