TL;DR
This paper introduces the weak sectional category as a new lower bound for the sectional category, improving upon classical bounds and with applications to topological complexity.
Contribution
It develops the concept of weak sectional category inspired by weak category, establishing properties and inequalities, and applies it to topological complexity.
Findings
Weak sectional category is a better lower bound than classical bounds.
Established properties and inequalities for the weak sectional category.
Applied the concept to study topological complexity.
Abstract
Based on a Whitehead-type characterization of the sectional category we develop the notion of weak sectional category. This is a new lower bound of the sectional category, which is inspired by the notion of weak category in the sense of Berstein-Hilton. We establish several properties and inequalities, including the fact that the weak sectional category is a better lower bound for the sectional category than the classical one given by the nilpotency of the kernel of the induced map in cohomology. Finally, we apply our results in the study of the topological complexity in the sense of Farber.
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