Analogs of cantor manifolds for transfinite dimensions

We construct metrizable Cantor manifolds for the transfinite extension of the Brouwer-Čech dimension tr Ind which are countable disjoint unions of Euclidean cubes and the irrationals. The construction is also simpler than constructions of metrizable Cantor manifolds for tr Ind published hitherto.

Transfinite (ordinal) numbers were a crucial step in the development of Cantor's set theory. The new concept depended in various ways on previous problems and results, and especially on two questions that were at the center of Cantor's attention in September 1882, when he was about to make his disco

## Abstract We effect a stabilization formalism for dimensions of measures and discuss the stability of upper and lower quantization dimension. For instance, we show for a Borel probability measure with compact support that its stabilized upper quantization dimension coincides with its packing dime

Let M 2n+1 (n 1) be a compact, spherical CR manifold. Suppose M 2n+1 is its universal cover and 8 : M 2n+1 Ä S 2n+1 is on injective CR developing map, where S 2n+1 is the standard unit sphere in the complex (n+1)-space C n+1 , then M 2n+1 is of the quotient form 0Â1, where 0 is a simply connected op