A compactification of an orbit space

Every Hausdorff Compactification of a Locally Compact Separable Space Is a Ga Compactification

1. I n t r o d u c t i o n . In [4], De Groot and Aarts constructed Hausdorff compactifications of topological spaces to obtain a new intrinsic characterization of complete regularity. These compactifications were called GA compactifications in [5] and [7]. A characterization of complete regularity was earlier given by Fr ink [3], by means of Wallman compactifications, a method which led to the...

A Compactification of a Fine Moduli Space of Curves

Discriminating properties of the space-time compactification

Compactification of the 5-dimensional Kaluza-Klein space-time geometry is produced. It is shown, that consideration of the space-time geometry as a physical geometry, i.e. as a geometry described completely by the world function, leads to a discrimination of some values of the particle momentum component along the fifth (charge) coordinate.

A compactification of the space of holomorphic maps from

Let Md(P ) be the space of (r + 1)-tuples (f0, · · · , fr) modulo homothety, where f0, · · · , fr are homogeneous polynomials of degree d in two variables. Let M ◦ d (P ) be the open subset of Md(P ) such that f0, · · · , fr have no common zeros. Then M ◦ d (P ) parametrizes the space of holomorphic maps of degree d from P1 into P. In general the boundary divisor Md(P ) \ M◦ d (P ) is not norma...

Compactification on soft fuzzy limit space

In this paper the concept of soft fuzzy filter on X, soft fuzzy prime filter on X, soft fuzzy ultrafilter on X, soft fuzzy minimal prime filter collections are introduced. The concept of soft fuzzy limit space (X, ltτ ) and the related properties are discussed. The functor ι from the collection of soft fuzzy filters F(X) to the collection of filters on X and the functor ω defined from the colle...