Uniform subsequential estimates on weakly null sequences

Abstract

We provide a generalization of two results of Knaust and Odell from KO2 and KO. We prove that if X is a Banach space and (gn)n=1∞ is a right dominant Schauder basis such that every normalized, weakly null sequence in X admits a subsequence dominated by a subsequence of (gn)n=1∞, then there exists a constant C such that every normalized, weakly null sequence in X admits a subsequence C-dominated by a subsequence of (gn)n=1∞. We also prove that if every spreading model generated by a normalized, weakly null sequence in X is dominated by some spreading model generated by a subsequence of (gn)n=1∞, then there exists C such that every spreading model generated by a normalized, weakly null sequence in X is C-dominated by every spreading model generated by a subsequence of (gn)n=1∞. We also prove a single, ordinal-quantified result which unifies and interpolates between these two results.