Does measure theory generalize real analysis to abstract spaces? For example, you can now talk about convergence even on unordered fields.
2026-03-25 02:31:35.1774405895
Relationship between measure theory and real analysis
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Haven't received any answers, so here's my take after some additional reflection: the answer is yes - partly. Some aspects are generalized, mostly those dealing with integration over spaces, as tangentially/indirectly discussed in the preface of Real Analysis: Modern Techniques and Their Applications by Folland.