Badly approximable systems of linear forms

We prove an inhomogeneous analogue of W. M. Schmidt's theorem on the Hausdorff dimension of the set of badly approximable systems of linear forms. The proof is based on ideas and methods from the theory of dynamical systems, in particular, on abundance of bounded orbits of mixing flows on homogeneou

## Abstract An Erratum has been published for this article in International Journal of Circuit Theory and Applications 2004; 32(6):633. It is shown that the elements of a large class of time‐invariant non‐linear input–output maps can be uniformly approximated arbitrarily well, over infinite time

It is known that large classes of approximately-"nite-memory maps can be uniformly approximated arbitrarily well by the maps of certain non-linear structures. As an application, it was proved that time-delay networks can be used to uniformly approximate arbitrarily well the members of a large class

For the set of linear dynamic systems with a given number of inputs and outputs, a complete set of independent invariants may be constructed and used to create state space and transfer function canonical forms. Snmmary--This paper is a study of the problem of how to parametfize the set of all finit

The properties of L 2 -approximable sequences established here form a complete toolkit for statistical results concerning weighted sums of random variables, where the weights are nonstochastic sequences approximated in some sense by squareintegrable functions and the random variables are "two-wing"