Eilenberg's inequality

Eilenberg's inequality is a mathematical inequality for Lipschitz-continuous functions.

Let ƒ : X → Y be a Lipschitz-continuous function between metric spaces whose Lipschitz constant is denoted by Lip ƒ. Then, Eilenberg's inequality states that

${\displaystyle \int _{Y}^{*}H_{m-n}(A\cap f^{-1}(y))\,dH_{n}(y)\leq {\frac {v_{m-n}v_{n}}{v_{m}}}({\text{Lip }}f)^{n}H_{m}(A),}$

for any A ⊂ X and all 0 ≤ n ≤ m, where

• the asterisk denotes the upper Lebesgue integral,
• v_n is the volume of the unit ball in Rⁿ,
• H_n is the n-dimensional Hausdorff measure.

The Eilenberg's Inequality is a key ingredient for the proof of the Coarea formula. Indeed, it confirms the Coarea formula when A is a set of measure zero. This allows the proof to ignore null sets as is a necessary step in many proofs in (geometric) analysis.

In many texts it is stated with some restriction on the metric spaces, but this is unnecessary. A full proof without any conditions on the metric spaces can be found in Reichel's PhD thesis referenced below.