If f_n → f pointwise a.e. and |f_n| ≤ g for some integrable g, then ∫ f_n → ∫ f. Lets us swap limit and integral without uniform convergence.
If f_n → f pointwise a.e. and |f_n| ≤ g for some integrable g, then ∫ f_n → ∫ f. Lets us swap limit and integral without uniform convergence.