Hahn-Banach theorem, normed linear space, functional analysis, topology
Abstract
This paper delves into the Hahn-Banach Theorem, elucidating its significance and applications in functional analysis and topology. It commences by highlighting foundational concepts in normed linear spaces and gradually builds towards a comprehensive exploration of the theorem’s multiple forms. By reconstructing the proof from basic principles, the paper demonstrates the theorem’s versatility in extending linear functionals from subspaces to universal sets, initially within real linear spaces and subsequently in complex scenarios. The proof employs techniques like sublinearity, seminorms, and Zorn’s Lemma to articulate the theorem’s efficacy in both real and complex linear spaces. This study also discusses the adaptation of the theorem in normed linear spaces, where the absence of an explicit dominating function presents unique challenges, and continuity replaces boundedness to establish the theorem’s claims. Through rigorous analysis, the paper confirms the theorem’s pivotal role in linking points and functions within normed spaces, thereby enhancing understanding of dual spaces and their topological implications. Additionally, the practical applications of the theorem in establishing the existence of linear functionals and exploring the relationship between points and functional norms in normed spaces are also detailed, underscoring the theorem’s enduring relevance in mathematical discourse.
