In mathematics, the Stolarsky mean is a generalization of the logarithmic mean. It was introduced by Kenneth B. Stolarsky in 1975. For two positive real...

misrepresentation. This family includes the logarithmic mean, geometric mean, and the identric mean. The Stolarsky means can be justified as minimizing these misrepresentation...

complex-valued function. Newmark-beta method Mean value theorem (divided differences) Racetrack principle Stolarsky mean J. J. O'Connor and E. F. Robertson (2000)...

Rényi's entropy (a generalized f-mean) Spherical mean Stolarsky mean Weighted geometric mean Weighted harmonic mean Mathematics portal Statistical dispersion...

Jensen's inequality Quasi-arithmetic mean Stolarsky mean Graziani, Rebecca; Veronese, Piero (2009). "How to Compute a Mean? The Chisini Approach and Its Applications"...

different mean which is related to logarithms is the geometric mean. The logarithmic mean is a special case of the Stolarsky mean. Logarithmic mean temperature...

x_{n}]={\frac {f^{(n)}(\xi )}{n!}}.} The theorem can be used to generalise the Stolarsky mean to more than two variables. de Boor, C. (2005). "Divided differences"...

according by the mean value theorem for divided differences. The identric mean is a special case of the Stolarsky mean. Mean Logarithmic mean RICHARDS, KENDALL...

others utilized this mean to study other bivariate means and inequalities. Mean Arithmetic mean Geometric mean Stolarsky mean Identric mean Means in Mathematical...

Monthly. 110 (5): 424–431. doi:10.2307/3647829. MR 2040885. Pečarić, Josip; Stolarsky, Kenneth B. (2001). "Carleman's inequality: history and new generalizations"...