Quasisymmetric robustness of the Collet-Eckmann condition in the quadratic family

This paper studies deviations of open-loop properties in the presence of modeling uncertainties. Our aim is to gain insights into how open-loop properties and thus potentially closed-loop properties may vary in the face of a diagonally structured uncertainty. We give several estimates for the worst

We study a family of differential operators L in two variables, depending on the coupling parameter 0 that appears only in the boundary conditions. Our main concern is the spectral properties of L , which turn out to be quite different for < 1 and for > 1. In particular, L has a unique self-adjoint

Conditional multivariate normal denaity function8 am used t o conatruot conditional quadratic discriminant funotione that adjust for covariate diffemncea between dieeese groupe. An expeoted actual error rate for the conditional diaoriminant funotion is defined. The purpoee of this paper is to use th

## Abstract In this paper we provide a characterization of the nonnegativity of a discrete quadratic functional ℐ with fixed right endpoint in the optimal control setting. This characterization is closely related to the kernel condition earlier introduced by M. Bohner as a part of a focal points de