On the lattice generated by Hamel functions (Q416428)

Recently, \textit{K. Płotka} in his paper [Proc. Am. Math. Soc. 131, No. 4, 1031--1041 (2003; Zbl 1012.15001)] introduced the notion of a Hamel function. This notion based on the notion of a Hamel basis on \(\mathbb R^2\), where \(\mathbb R\) is the set of reals.NEWLINENEWLINE A function \(f : \mathbb R \to \mathbb R\) is a Hamel function (written \(f\in \mathrm{HF}\)) if \(f\) considered as a subset of \(\mathbb R^2\) is a Hamel basis of \(\mathbb R^2\) and it is linearly independent over \(\mathbb Q\) (written \(f\in\mathrm{LIF}\)) if it is linearly independent over \(\mathbb Q\) as a subset of \(\mathbb R^2\), where \(\mathbb Q\) is the set of rationals. If the domain of such a function \(f\) is a subset of \(\mathbb R\) it is named partial function and is denoted by \(f\in\mathrm{PHF}\) or \(f\in\mathrm{PLIF}\) respectively.NEWLINENEWLINE The symbols \(\mathcal L(\mathrm{HF})\) and \(\mathcal L(\mathrm{LIF})\) stand for the lattices generated by HF and LIF respectively.NEWLINENEWLINEThis paper contributes to the further study of the class of Hamel functions and the class of linearly independent functions.NEWLINENEWLINEMore precisely the author introduces the notion of \(n\)-Hamel functions and proves between other interesting results that \(\mathcal L(\mathrm{HF})=\{f\in\mathbb R^\mathbb R: f\text{ is an }n\)-Hamel function for some