OnG-semidifferentiable functions in Euclidean spaces

A space curve distorted by certain transformations may be recognized if an invariant description of it is available. Recent research in this area, primarily dealing with plane curves, has shown that it is possible to identify transformed curves through the use of various combinations of differential

## Abstract In this paper we consider the problem of constructing in domains Ωof ℝ^__m__+1^ with a specific geometric property, a conjugate harmonic __V__ to a given harmonic function __U__, as a direct generalization of the complex plane case. This construction is carried out in the framework of C

Let 0 < r R and A be a subset of the n-dimensional Euclidean space E n , which is contained in B(x 0 , R) and contains points x 0 , x 0 + re 1 , . . . , x 0 + re n , where the vectors {e i } n i=1 are orthonormal. We show that if f : A → E n is an -isometry, then there is an affine isometry U such t

Even lattices similar to their duals are discussed in connection with modular forms for Fricke groups. In particular, lattices of level 2 with large Hermite number are considered, and an analogy between the seven levels \(l\) such that \(1+l\) divides 24 is stressed. "t 1995 Academic Press, Inc.

## 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