On the KR and WKR points of Orlicz spaces (Q1128026)

Let \(X\) be a Banach space and let \(S(X)\) denote the unit sphere of \(X\). Definition 1. A point \(x\in S(X)\) is called an UR point (WUR point whenever for any \(\{ x_{n}\}\subset S(X)\) such that \(| x_{n} + x| \rightarrow 2\) as \( n \rightarrow \infty\) holds: \(| x_{n}- x| \rightarrow 0\) (respectively, \(x_{n} \rightarrow x\) weakly) as\ \(n\rightarrow \infty\). If every point on \(S(X)\) is a UR point\ (WUR point), then \(X\) is said to be a LUR (WLUR) space. Definition 2. A point \(x\in S(X)\) is called a KR point (WKR point) whenever it has the following property: If \(\{ x_{n}\}\) is a sequence from \(S(X)\) such that \(| (x_{n_{1}}+\dots +x_ {n_{k}}+x)/(k+1)| \rightarrow 1\) as \(n_{1},\dots ,n_{k} \rightarrow\infty\), then \(| x_{n}-x| \rightarrow 0\) (respectively, \(x_{n} \rightarrow x\) weakly) as \(n\rightarrow \infty\). If every point of \(S(X)\) is a KR point (WKR point), then \(X\) is said to be a LKR (WLKR) space. The authors establish the following statement: For any Orlicz space \(L_{\phi}\) the following assertions are equivalent: (1) \(L_{\phi}\) is LUR; (2) \(L_{\phi}\) is WLUR; (3) \(L_{\phi}\) is LKR; (4) \(L_{\phi}\) is WLKR; (5) \(\phi\in \Delta_{2}\) for large numbers, and \(\phi\) is a strictly convex function.