MATH630

Real Analysis I

Prerequisite: MATH411; or students who have taken courses with comparable content may contact the department. Lebesgue measure and the Lebesgue integral on R, differentiation of functions of bounded variation, absolute continuity and fundamental theorem of calculus, Lp spaces on R, Riesz-Fischer theorem, bounded linear functionals on Lp, measure and outer measure, Fubini's theorem.

Fall 2024

69 reviews
Average rating: 3.04

Fall 2023

60 reviews
Average rating: 3.72

Past Semesters

25 reviews
Average rating: 3.84

18 reviews
Average rating: 4.78

35 reviews
Average rating: 3.91

6 reviews
Average rating: 2.83

10 reviews
Average rating: 5.00

* "W"s are considered to be 0.0 quality points. "Other" grades are not factored into GPA calculation. Grade data not guaranteed to be correct.