Płotka, Krzysztof; Recław, Ireneusz Finitely continuous Hamel functions. (English) Zbl 1107.26006 Real Anal. Exch. 30(2004-2005), No. 2, 867-870 (2005). Let \(f:\mathbb{R}^n\to\mathbb{R}^k\) be a function and \(\kappa\leq c\) be a cardinal number. A function \(f\) is a Hamel function if \(f\), considered as a subset of \(\mathbb{R}^{n+k}\), is a Hamel basis for \(\mathbb{R}^{n+k}\) (no distinction is made between a function and its graph). The function \(f\) is called \(\kappa\)-continuous if it can be covered by the union of \(\kappa\) many partial continuous functions from \(\mathbb{R}^n\). The main result is: there exists a Hamel function \(h:\mathbb{R}^n\to\mathbb{R}^k\) which is \((n+2)\)-continuous \((k,n\geq 1)\). Reviewer: Zoltán Finta (Cluj-Napoca) Cited in 4 Documents MSC: 26A15 Continuity and related questions (modulus of continuity, semicontinuity, discontinuities, etc.) for real functions in one variable Keywords:finitely continuous functions × Cite Format Result Cite Review PDF Full Text: DOI