Finitely continuous Hamel functions.

Krzysztof Płotka; Ireneusz Rec\l aw

doi:rae/1129416490

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Home > Journals > Real Anal. Exchange > Volume 30 > Issue 2 > Article

2004-2005 Finitely continuous Hamel functions.

Krzysztof Płotka, Ireneusz Rec\l aw

Author Affiliations +

Krzysztof Płotka,¹ Ireneusz Rec\l aw²
¹University of Scranton
²Gdańsk University

Real Anal. Exchange 30(2): 867-870 (2004-2005).

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Abstract

A function $h : \mathbb{R}^n \to \mathbb{R}^k$ is called a Hamel function if it is a Hamel basis for $\mathbb{R}^{n+k}$. We prove that there exists a Hamel function which is finitely continuous (its graph can be covered by finitely many partial continuous functions). This answers the question posted in [3].