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In mathematics and statistics, the quasi-arithmetic mean or generalised f-mean is one generalisation of the more familiar means such as the arithmetic mean and the geometric mean, using a function ${\displaystyle f}$. It is also called Kolmogorov mean after Russian scientist Andrey Kolmogorov.

Definition

If f is a function which maps an interval ${\displaystyle I}$ of the real line to the real numbers, and is both continuous and injective then we can define the f-mean of two numbers

${\displaystyle x_{1},x_{2}\in I}$

as

${\displaystyle M_{f}(x_{1},x_{2})=f^{-1}\left({\frac {f(x_{1})+f(x_{2})}{2}}\right).}$

For ${\displaystyle n}$ numbers

${\displaystyle x_{1},\dots ,x_{n}\in I}$,

the f-mean is

${\displaystyle M_{f}(x_{1},\dots ,x_{n})=f^{-1}\left({\frac {f(x_{1})+\cdots +f(x_{n})}{n}}\right).}$

We require f to be injective in order for the inverse function ${\displaystyle f^{-1}}$ to exist. Since ${\displaystyle f}$ is defined over an interval, ${\displaystyle {\frac {f\left(x_{1}\right)+f\left(x_{2}\right)}{2}}}$ lies within the domain of ${\displaystyle f^{-1}}$.

Since f is injective and continuous, it follows that f is a strictly monotonic function, and therefore that the f-mean is neither larger than the largest number of the tuple ${\displaystyle x}$ nor smaller than the smallest number in ${\displaystyle x}$.

Examples

• If we take ${\displaystyle I}$ to be the real line and ${\displaystyle f=\mathrm {id} }$, (or indeed any linear function ${\displaystyle x\mapsto a\cdot x+b}$, ${\displaystyle a}$ not equal to 0) then the f-mean corresponds to the arithmetic mean.

• If we take ${\displaystyle I}$ to be the set of positive real numbers and ${\displaystyle f(x)=\log(x)}$, then the f-mean corresponds to the geometric mean. According to the f-mean properties, the result does not depend on the base of the logarithm as long as it is positive and not 1.

• If we take ${\displaystyle I}$ to be the set of positive real numbers and ${\displaystyle f(x)={\frac {1}{x}}}$, then the f-mean corresponds to the harmonic mean.

• If we take ${\displaystyle I}$ to be the set of positive real numbers and ${\displaystyle f(x)=x^{p}}$, then the f-mean corresponds to the power mean with exponent ${\displaystyle p}$.

Properties

• Partitioning: The computation of the mean can be split into computations of equal sized sub-blocks.

${\displaystyle M_{f}(x_{1},\dots ,x_{n\cdot k})=M_{f}(M_{f}(x_{1},\dots ,x_{k}),M_{f}(x_{k+1},\dots ,x_{2\cdot k}),\dots ,M_{f}(x_{(n-1)\cdot k+1},\dots ,x_{n\cdot k}))}$

• Subsets of elements can be averaged a priori, without altering the mean, given that the multiplicity of elements is maintained.

With ${\displaystyle m=M_{f}(x_{1},\dots ,x_{k})}$ it holds

${\displaystyle M_{f}(x_{1},\dots ,x_{k},x_{k+1},\dots ,x_{n})=M_{f}(\underbrace {m,\dots ,m} _{k{\text{ times}}},x_{k+1},\dots ,x_{n})}$

• The quasi-arithmetic mean is invariant with respect to offsets and scaling of ${\displaystyle f}$:

${\displaystyle \forall a\ \forall b\neq 0((\forall t\ g(t)=a+b\cdot f(t))\Rightarrow \forall x\ M_{f}(x)=M_{g}(x)}$.

• If ${\displaystyle f}$ is monotonic, then ${\displaystyle M_{f}}$ is monotonic.
• Any quasi-arithmetic mean ${\displaystyle M}$ of two variables has the mediality property ${\displaystyle M(M(x,y),M(z,w))=M(M(x,z),M(y,w))}$ and the self-distributivity property ${\displaystyle M(x,M(y,z))=M(M(x,y),M(x,z))}$. Moreover, any of those properties is essentially sufficient to characterize quasi-arithmetic means; see Aczél–Dhombres, Chapter 17.
• Any quasi-arithmetic mean ${\displaystyle M}$ of two variables has the balancing property ${\displaystyle M{\big (}M(x,M(x,y)),M(y,M(x,y)){\big )}=M(x,y)}$. An interesting problem is whether this condition (together with fixed-point, symmetry, monotonicity and continuity properties) implies that the mean is quasi-arthmetic. Georg Aumann showed in the 1930s that the answer is no in general,^[1] but that if one additionally assumes ${\displaystyle M}$ to be an analytic function then the answer is positive.^[2]

Homogeneity

Means are usually homogeneous, but for most functions ${\displaystyle f}$, the f-mean is not. Indeed, the only homogeneous quasi-arithmetic means are the power means and the geometric mean; see Hardy–Littlewood–Pólya, page 68.

The homogeneity property can be achieved by normalizing the input values by some (homogeneous) mean ${\displaystyle C}$.

${\displaystyle M_{f,C}x=Cx\cdot f^{-1}\left({\frac {f\left({\frac {x_{1}}{Cx}}\right)+\cdots +f\left({\frac {x_{n}}{Cx}}\right)}{n}}\right)}$

However this modification may violate monotonicity and the partitioning property of the mean.

References

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• Aczél, J.; Dhombres, J. G. (1989) Functional equations in several variables. With applications to mathematics, information theory and to the natural and social sciences. Encyclopedia of Mathematics and its Applications, 31. Cambridge Univ. Press, Cambridge, 1989.
• Andrey Kolmogorov (1930) “On the Notion of Mean”, in “Mathematics and Mechanics” (Kluwer 1991) — pp. 144–146.
• Andrey Kolmogorov (1930) Sur la notion de la moyenne. Atti Accad. Naz. Lincei 12, pp. 388–391.
• John Bibby (1974) “Axiomatisations of the average and a further generalisation of monotonic sequences,” Glasgow Mathematical Journal, vol. 15, pp. 63–65.
• Hardy, G. H.; Littlewood, J. E.; Pólya, G. (1952) Inequalities. 2nd ed. Cambridge Univ. Press, Cambridge, 1952.

See also

• Generalized mean
• Jensen's inequality