Topologies generated by the \(\psi\)-sparse sets (Q416385)

The two authors of the present paper introduce the notion of a \(\psi\)-sparse set at a point \(x\) of \(\mathbb{R}\) for continuous non decreasing functions \(\psi:(0,\infty)\rightarrow (0,1)\) such that \(\lim_{x\rightarrow 0^{+}}\psi(x)=0\). Some properties of such type of sets are studied. The authors also construct the \(\psi\)-sparse topology \(\tau_{\psi}=\{ E \in \mathcal{L}: E\subset \Gamma_{\psi}(E)\}\) on the real line, where \(\mathcal{L}\) is the \(\sigma\)-algebra of Lebesgue measurable sets and \(\Gamma_{\psi}(E)=\{x \in \mathbb{R}: x\text{ is a }\psi\)-sparse point of