Tree-Structured Exponential Regression Modeling

## Abstract We consider the construction of designs for exponential regression. The response function is an only approximately known function of a specified exponential function. As well, we allow for variance heterogeneity. We find minimax designs and corresponding optimal regression weights in th

This paper introduces a new complexity measure for binary sequences, the tree complexity. The tree complexity of a sequence grows asymptotically like O(2 2 h ) (h the height of the tree) for random sequences. Functions in F 2 [[x]] can be identified with their coefficient sequence. Under this aspect

A multivariate normal statistical model defined by the Markov properties determined by an acyclic digraph admits a recursive factorization of its likelihood function (LF) into the product of conditional LFs, each factor having the form of a classical multivariate linear regression model (#MANOVA mod

We propose a simple class of multivariate GARCH models, allowing for timevarying conditional correlations. Estimates for time-varying conditional correlations are constructed by means of a convex combination of averaged correlations (across all series) and dynamic realized (historical) correlations.