On the logical Janus-face of weak continuity
| Autor: | Sanders, Sam |
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| Rok vydání: | 2024 |
| Předmět: | |
| Druh dokumentu: | Working Paper |
| Popis: | Continuity is one of the most central notions in mathematics and related areas. An interesting related topic is decompositions of continuity, where continuity is shown to be equivalent to the combination of two or more weak continuity notions. Now, from a logical viewpoint, continuity is fairly tame in that its basic properties are readily established in rather weak logical systems. It is then a natural question whether the same holds for the aforementioned weak continuity notions. In this paper, we establish the Janus-face nature of weak continuity notions: we identify numerous weak continuity notions that are as tame as continuity, but also list a number of extremely wild weak continuity notions for which basic properties, like finding the supremum or evaluating the Riemann integral, are extremely hard to prove. To make our heuristic notions (tame, wild, weak) precise, we adopt Reverse Mathematics, a program in the foundation of mathematics that seeks to identify the minimal axioms that prove a given theorem. Particularly surprising and novel is that our `wild' theorems exist at the outer edges of Reverse Mathematics, i.e. while rather basic, they imply full second-order arithmetic. Comment: 15 pages |
| Databáze: | arXiv |
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