#### Learning Outcomes

Students should have a thorough understanding of the topics listed in the minimal learning outcomes section of the Math 641 Wiki page. As evidence of that understanding, students should be able to demonstrate mastery of all relevant vocabulary, familiarity with common examples and counterexamples, knowledge of the content of the major theorems, understanding of the ideas in their proofs, and ability to make direct application of those results to related problems.

#### Overview

Math 641 is a course in abstract measure and integration theory. There will be some repetition of topics between Math 541and Math 641, but it is felt that the repetition will help solidify student understanding, and there will be a difference in approach, with the lower-level course taking a concrete approach restricted to Lebesgue measure.