Embeddings of 𝑛-dimensional separable metric spaces into the product of Sierpinski curves

Michalik, Daria

doi:10.1090/S0002-9939-07-08782-5

Embeddings of $n$-dimensional separable metric spaces into the product of Sierpinski curves
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Proc. Amer. Math. Soc. 135 (2007), 2661-2664 Request permission

Abstract:

We give a short proof of the following fact: the set of embeddings of any $n$-dimensional separable metric space $X$ into a certain $n$-dimensional subset of the $(n+1)$-product of Sierpiński curves $\Sigma$ is residual in $C(X, \Sigma ^{n+1})$.

References

S. Eilenberg, Sur les transformations à petites tranches, Fund. Math. 30 (1938), 92–95.
Ryszard Engelking, Theory of dimensions finite and infinite, Sigma Series in Pure Mathematics, vol. 10, Heldermann Verlag, Lemgo, 1995. MR 1363947
Ryszard Engelking, General topology, 2nd ed., Sigma Series in Pure Mathematics, vol. 6, Heldermann Verlag, Berlin, 1989. Translated from the Polish by the author. MR 1039321
A. B. Forge, Dimension preserving compactifications allowing extensions of continuous functions, Duke Math. J. 28 (1961), 625–627. MR 167955
Ivan Ivanšić and Uroš Milutinović, A universal separable metric space based on the triangular Sierpiński curve, Topology Appl. 120 (2002), no. 1-2, 237–271. In memory of T. Benny Rushing. MR 1895494, DOI 10.1016/S0166-8641(01)00017-7
Yaki Sternfeld, Mappings in dendrites and dimension, Houston J. Math. 19 (1993), no. 3, 483–497. MR 1242434
H. Toruńczyk, Finite-to-one restrictions of continuous functions. II, General topology and its relations to modern analysis and algebra, VI (Prague, 1986) Res. Exp. Math., vol. 16, Heldermann, Berlin, 1988, pp. 589–599. MR 952641