Modular Lattices in Euclidean Spaces

## Abstract We study concepts of decidability (recursivity) for subsets of Euclidean spaces ℝ^__k__^ within the framework of approximate computability (type two theory of effectivity). A new notion of approximate decidability is proposed and discussed in some detail. It is an effective variant of F

The purpose of this paper is to prove some addition theorems for measurable and lattice subsets of Euclidean space with application to an inverse additive problem.

In this note we consider integral lattices 4 in euclidean space (R n , ,), i.e. 4 R n is the Z-span of an R-basis of R n with ,(4, 4) Z. The minimum of 4 is min[,(4, 4) | 0{\* # 4]. It is interesting to find lattices of given determinant or of given genus with large minimum. We prove the following

A set of points W in Euclidean space is said to realize the finite group G if the isometry group of W is isomorphic to G. We show that every finite group G can be realized by a finite subset of some n , with n < G . The minimum dimension of a Euclidean space in which G can be realized is called its

## Abstract Specific wavelet functions, related to the Bessel functions, for the continuous wavelet transform in higher dimension, are constructed in the framework of Clifford analysis. Copyright © 2002 John Wiley & Sons, Ltd.