Intersections of analytic sets with linear subspaces

By Grauert imbedding theorem [3] which ensures that every countable real analytic manifold is isomorphic with a closed analytic submanifold of.. a (real) affine

The aim of this note is to introduce the concept of analytic set over a given topological space Q (in the classical theory Q is the space 1 of irrational numbers) derived from a

Moreover, using optimal coe cient estimators derived through the inversion of the covariance matrix, the corresponding maximal error has lower and upper bounds with exponential

The équitable rational préférence relations allow us to define the concept of equitably efficiënt solution [11], similar to the Standard efficient (Pareto-optimal) solution defined

When F is complex homogeneous of order zero the theorem is most naturally regarded as an approximation theorem for plurisubharmonie functions in open subsets of projective

Thus all these algebras satisfy the analytic Ditkin condition; t h e y include in particular the algebra C(OD), the algebra of absolutely convergent Fourier series,

Before proceeding to get an indication of the situation on open Riemann surfaces, it is perhaps useful to briefly mention a few items about the boundary

(I) and Bagemihl and ErdSs [I] proved that all C1-rearrangement sets of real series are either of the form (I) or are given by Riemann's theorem (see section 17