Test closures of sets in a Banach space for linear functionals (Q1386568)

From the article is the following definition: Assume that \(E\) is a Banach space, \(E^*\) is its conjugate space, \(X,Y\subset E\), and \(F,\Phi\subset E^*\) are arbitrary nonempty sets. Definition 1. The set \(X\) is called an \((F,\Phi)\)-test set for the set \(Y\) if, for any sequence of functionals \((f_n)^\infty_{n= 1}\subset F\) with norms collectionwise bounded and any functional \(\varphi\in \Phi\), the validity of the limiting equality \(\lim_{n\to\infty} f_n(x)= \varphi(x)\) for every element \(x\in X\) implies its validity for every element \(y\in Y\), which is naturally called an \((F,\Phi)\)-test adherent point of the set \(X\). This paper gives solutions to the following problem: Given sets \(X\), \(F\), and \(\Phi\), find necessary and/or sufficient conditions on set \(Y\) for which the set \(X\) is an \((F,\Phi)\)-test set.