Popoviciu's inequality explained

Popoviciu's inequality should not be confused with Popoviciu's inequality on variances.

In convex analysis, Popoviciu's inequality is an inequality about convex functions. It is similar to Jensen's inequality and was found in 1965 by Tiberiu Popoviciu,[1] a Romanian mathematician.

Formulation

Let f be a function from an interval

I\subseteqR

to

R

. If f is convex, then for any three points x, y, z in I,
f(x)+f(y)+f(z)
3

+f\left(

x+y+z
3

\right)\ge

2
3

\left[f\left(

x+y
2

\right)+f\left(

y+z
2

\right)+f\left(

z+x
2

\right)\right].

If a function f is continuous, then it is convex if and only if the above inequality holds for all xyz from

I

. When f is strictly convex, the inequality is strict except for x = y = z.

Generalizations

It can be generalized to any finite number n of points instead of 3, taken on the right-hand side k at a time instead of 2 at a time:

Let f be a continuous function from an interval

I\subseteqR

to

R

. Then f is convex if and only if, for any integers n and k where n ≥ 3 and

2\leqk\leqn-1

, and any n points

x1,...,xn

from I,
1
k

\binom{n-2}{k-2}\left(

n-k
k-1
n
\sum
i=1

f(xi)+nf\left(

1n\sum
i=1

nxi\right)\right)\ge

\sum
1\lei1<...<ik\len

f\left(

1k
\sum
k
j=1
x
ij

\right)

[2]

Weighted inequality

Popoviciu's inequality can also be generalized to a weighted inequality.

Let f be a continuous function from an interval

I\subseteqR

to

R

. Let

x1,x2,x3

be three points from

I

, and let

w1,w2,w3

be three nonnegative reals such that

w2+w3\ne0,w3+w1\ne0

and

w1+w2\ne0

. Then,

\begin{aligned}&w1f\left(x1\right)+w2f\left(x2\right)+w3f\left(x3\right)+\left(w1+w2+w3\right)f\left(

w1x1+w2x2+w3x3
w1+w2+w3

\right)\\&\geq\left(w2+w3\right)f\left(

w2x2+w3x3
w2+w3

\right)+\left(w3+w1\right)f\left(

w3x3+w1x1
w3+w1

\right)+\left(w1+w2\right)f\left(

w1x1+w2x2
w1+w2

\right)\end{aligned}

Notes and References

  1. Popoviciu's paper has been published in Romanian language, but the interested reader can find his results in the review . Page 1 Page 2
  2. Grinberg . Darij . 0803.2958v1 . Generalizations of Popoviciu's inequality . math.FA . 2008.