A Borsuk-Ulman type theorem for $\mathbb{Z}_{4}$-actions

Authors

  • Simeon Stefanov

Abstract

Let $n=2k+1$ and the sphere $S^n$ be represented as

$S^n=\{ z=(z_1,..,z_{k+1}) \in C^{k+1}||z||=1 \}$

Consider the canonical action of the group $Z_4=\{ 1,i,-1,-i\}$ in $S^n$ defined by multiplication. The main result in the article is the following Borsuk-Ulam type theorem:

For any continuous function $f:S^n \rightarrow R^1$ consider the set

$A(f)=\{z \in S^n|f(z)=f(iz)=f(-z)=f(-iz)\}$

Then dim$A(f) \ geq n-3$.

The main corollary: For any continuous function $f:S^3 \rightarrow R^1$ there exists $z \in S^3$ such that

$$f(z)=f(iz)=f(-z)=f(-iz)$$

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Published

1995-12-12

How to Cite

Stefanov, S. (1995). A Borsuk-Ulman type theorem for $\mathbb{Z}_{4}$-actions. Ann. Sofia Univ. Fac. Math. And Inf., 87, 279–286. Retrieved from https://ftl5.uni-sofia.bg./index.php/fmi/article/view/421