On the Asymptotically Well Behaved Functions and Global Error Bound for Convex Polynomials

Theoretical accuracies are studied for asymtotic approximations of the expected probabilities of misclassification (EPMC) when the linear discriminant function is used to classify an observation as coming from one of two multivariate normal populations with a common covariance matrix. The asymptotic

We construct infinite class field towers of global function fields with asymptotically many rational places. In this way, we improve on asymptotic bounds of SERRE, PERRET, SCHOOF, and XING. The results can be interpreted equivalently as asymptotic bounds on the number of rational points of smooth al

We consider the problem of integrating a function f : [-1, l] -+ R which has an analytic extension f to an open disk Dr of radius r and center the origin, such that If(z)] 5 1 for any z E d,. The goal of this paper is to study the minimal error among all algorithms which evaluate the integrand at t