Some types of convergence of sequences of real valued functions (Q1766423)

Let \(X\) be a metric space and \(f\), \(f_n: X\to\mathbb{R}\) \((n_0\in\mathbb{N})\). The authors examine different kinds of convergence \(f_n\to f\) defined earlier in the literature or introduced here (\(\alpha\)-convergence, \(\alpha\)-uniform equal convergence, \(\alpha\)-strong uniform equal convergence, \(\alpha\)-equal convergence, uniform equal convergence, uniform discrete convergence, equal convergence, discrete convergence, etc.). The main purpose of the paper is to obtain statements of the following type: if \(f_n\to f\) in a way \(\gamma\) then \(f_n\to f\) in a way \(\delta\). A series of such results and some counterexamples are obtained.