TL;DR
This paper redefines core real analysis concepts using the notion of 'arbitrarily close' as a foundational idea, offering an alternative approach to understanding limits, closure, and continuity.
Contribution
It introduces a novel framework for real analysis by systematically developing key concepts from the perspective of 'arbitrarily close' neighborhoods.
Findings
Provides an alternative foundation for real analysis concepts.
Reframes definitions of limits, closure, and continuity.
Enhances conceptual understanding through the 'arbitrarily close' perspective.
Abstract
Mathematicians tend to use the phrase "arbitrarily close" to mean something along the lines of "every neighborhood of a point intersects a set". Taking the latter statement as a technical definition for arbitrarily close leads to an alternative development of classic concepts in real analysis such as supremum, closure, convergence and limits of sequences, closure, connectedness, compactness, and continuity. The goal of this text is to provide readers with an introduction to real analysis by taking deliberate steps to parse these difficult concepts using arbitrarily close as the kernel.
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Taxonomy
TopicsAdvanced Topology and Set Theory · Optimization and Variational Analysis · Computability, Logic, AI Algorithms