Functions represented as sums of two quasicontinuous functions with a closed graph (Q1034066)

In this very interesting paper the author considers the class consisting of the functions \(f :X \rightarrow \mathbb{R}\) that are continuous or fulfil the conditions that (i) the set \(D(f)\) is separable, (ii) the restriction \(f_{|D(f)}\) is continuous and (iii) \(\varlimsup_{u \rightarrow x} |f(u)| = \infty\) for every \(x \in D(f)\). The author primarily shows that if \(X\) is an infinite metric space then every function having the above mentioned property can be expressed as a sum of two quasicontinuous functions on \(X\) with a closed graph.