Let f₁, f₂, ... denote a sequence of real-valued measurable functions defined on a measure space (S,Σ,μ). If there exists a Lebesgue-integrable function g on S which dominates the sequence in absolute value, meaning that |f_n| ≤ g for all natural numbers n, then all f_n as well as the limit inferior and the limit superior of the f_n are integrable and

${\displaystyle \int _{S}\liminf _{n\to \infty }f_{n}\,d\mu \leq \liminf _{n\to \infty }\int _{S}f_{n}\,d\mu \leq \limsup _{n\to \infty }\int _{S}f_{n}\,d\mu \leq \int _{S}\limsup _{n\to \infty }f_{n}\,d\mu \,.}$ 

Here the limit inferior and the limit superior of the f_n are taken pointwise. The integral of the absolute value of these limiting functions is bounded above by the integral of g.

Since the middle inequality (for sequences of real numbers) is always true, the directions of the other inequalities are easy to remember.

All f_n as well as the limit inferior and the limit superior of the f_n are measurable and dominated in absolute value by g, hence integrable.

The first inequality follows by applying Fatou's lemma to the non-negative functions f_n + g and using the linearity of the Lebesgue integral. The last inequality is the reverse Fatou lemma.

Since g also dominates the limit superior of the |f_n|,

${\displaystyle 0\leq {\biggl |}\int _{S}\liminf _{n\to \infty }f_{n}\,d\mu {\biggr |}\leq \int _{S}{\Bigl |}\liminf _{n\to \infty }f_{n}{\Bigr |}\,d\mu \leq \int _{S}\limsup _{n\to \infty }|f_{n}|\,d\mu \leq \int _{S}g\,d\mu }$ 

by the monotonicity of the Lebesgue integral. The same estimates hold for the limit superior of the f_n.

• Topics in Real and Functional Analysis by Gerald Teschl, University of Vienna.

• "Fatou-Lebesgue theorem". PlanetMath.