Stolarsky mean

In mathematics, the Stolarsky mean is a generalization of the logarithmic mean. It was introduced by Kenneth B. Stolarsky in 1975.^[1]

For two positive real numbers x, y the Stolarsky Mean is defined as:

${\displaystyle \begin{array}{rl}{S}_p(x,y)& =\underset{(\xi ,\eta )\to (x,y)}{\lim }{\left(\frac{{\xi }^p-{\eta }^p}{p(\xi -\eta )}\right)}^{1/(p-1)}\\ & =\{\begin{array}{ll}x& \text{if }x=y\\ {\left(\frac{x^p-y^p}{p(x-y)}\right)}^{1/(p-1)}& \text{else}\end{array}\end{array}}$

It is derived from the mean value theorem, which states that a secant line, cutting the graph of a differentiable function ${\displaystyle f}$ at ${\displaystyle (x,f(x))}$ and ${\displaystyle (y,f(y))}$, has the same slope as a line tangent to the graph at some point ${\displaystyle \xi }$ in the interval ${\displaystyle [x,y]}$.

${\displaystyle \mathrm{\exists }\xi \in [x,y]f^{\prime }(\xi )=\frac{f(x)-f(y)}{x-y}}$

The Stolarsky mean is obtained by

${\displaystyle \xi ={\left[f^{\prime }\right]}^{-1}\left(\frac{f(x)-f(y)}{x-y}\right)}$

when choosing ${\displaystyle f(x)=x^p}$.

• ${\displaystyle \underset{p\to -\mathrm{\infty }}{\lim }{S}_p(x,y)}$ is the minimum.
• ${\displaystyle S_{-1}(x,y)}$ is the geometric mean.
• ${\displaystyle \underset{p\to 0}{\lim }{S}_p(x,y)}$ is the logarithmic mean. It can be obtained from the mean value theorem by choosing ${\displaystyle f(x)=\ln x}$.
• ${\displaystyle S_{\frac{1}{2}}(x,y)}$ is the power mean with exponent ${\displaystyle \frac{1}{2}}$.
• ${\displaystyle \underset{p\to 1}{\lim }{S}_p(x,y)}$ is the identric mean. It can be obtained from the mean value theorem by choosing ${\displaystyle f(x)=x\cdot \ln x}$.
• ${\displaystyle S_2(x,y)}$ is the arithmetic mean.
• ${\displaystyle S_3(x,y)=QM(x,y,GM(x,y))}$ is a connection to the quadratic mean and the geometric mean.
• ${\displaystyle \underset{p\to \mathrm{\infty }}{\lim }{S}_p(x,y)}$ is the maximum.

One can generalize the mean to n + 1 variables by considering the mean value theorem for divided differences for the nth derivative. One obtains

${\displaystyle S_p(x_0,\dots ,x_n)={f^{(n)}}^{-1}(n!\cdot f[x_0,\dots ,x_n])}$ for ${\displaystyle f(x)=x^p}$.

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