A note on Nikol'skii's inequality (Q2266409)

In this paper, several examples have been constructed to exhibit the importance of various conditions which appear in the generalized version of Nikol'skij's inequality for locally convex spaces, namely ''Let \(\{x_ n\}\) be a sequence in a TVS (resp. an l.c. TVS) (X,T) with \(x_ n\neq 0\), \(n\geq 1\) and \(X=[x_ n]\equiv \overline{sp}\{x_ n\}.\) If for each \(p\in D_ x\), there exists \(M_ p>0\) and \(q\in D_ x\) satisfying \[ (*)\quad p(\sum^{m}_{i=1}\alpha_ ix_ i)\leq M_ pq(\sum^{n}_{i=1}\alpha_ ix_ i) \] for arbitrary m,n\(\in {\mathbb{N}}\), \(m\leq n\) and arbitrary scalars \(\alpha_ 1,\alpha_ 2,...,\alpha_ n\), then \(\{x_ n\}\) is a Schauder base for (X,T) where \(D_ x\) is the family of all pseudonorms (seminorms) generating the topology T. Conversely, if (X,T) has a set of second category (in particular if (X,T) is barrelled) and \(\{x_ n\}\) is a Schauder base for (X,T), then (*) is satisfied.''