FPM 1998, vol. 4, no. 1, pp. 155-164

FUNDAMENTALNAYA I PRIKLADNAYA MATEMATIKA

(FUNDAMENTAL AND APPLIED MATHEMATICS)

1998, VOLUME 4, NUMBER 1, PAGES 155-164

On geometry of continuous mappings of countable functional weight

B. A. Pasynkov

Abstract

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A continuous mapping $$f: X → Y$$ is parallel to a space $Z$ if it is embeddable into the projection of the topological product $Y × Z$ onto $Y$ . The theorems of W. Hurewicz (on the existence of a zero-dimensional continuous mapping into $k$ -cube for any $k$ -dimensional metrizable compactum) and of Nöbeling--Pontrjagin--Lefschetz (on the embeddability of any $k$ -dimensional metrizable compactum into $(2k+1)$ -cube) are extended to continuous mappings of countable functional weight (i. e. mappings parallel to the Hilbert cube) of finite-dimensional (in sense of $dim$ ) Tychonoff spaces.

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