- 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...
- (sequence A035513 in the OEIS).
Inspired by a
similar Stolarsky array previously defined by
Stolarsky (1977),
Morrison (1980)
defined the
Wythoff array as...
- (quadratic mean) Rényi's
entropy (a
generalized f-mean)
Spherical mean
Stolarsky mean
Weighted geometric mean
Weighted harmonic mean
Mathematics portal...
- Huntington-Hill technique)
satisfy this property.: 53 Similarly, the
Stolarsky mean can be used to
define a
family of
divisor methods that minimizes...
- Fréchet mean
Generalized mean Jensen's
inequality Quasi-arithmetic mean
Stolarsky mean Graziani, Rebecca; Veronese,
Piero (2009). "How to
Compute a Mean...
- is the
geometric mean. The
logarithmic mean is a
special case of the
Stolarsky mean.
Logarithmic mean
temperature difference Log
semiring Citations B...
-
George Barbier Jerome Dempsey Dann
Florek Earl
Williams George Leach Paul
Stolarsky John
Magaro Diamond Louis Eduardo Ciannelli Michael Rothhaar Danny Mastrogiorgio...
- 1038/290063a0. PMID 7207587. S2CID 4318349.
Rosenfeld MG, Lin CR,
Amara SG,
Stolarsky L, Roos BA, Ong ES,
Evans RM (March 1982). "Calcitonin mRNA polymorphism:...
- 1038/290063a0. PMID 7207587. S2CID 4318349.
Rosenfeld MG, Lin CR,
Amara SG,
Stolarsky L, Roos BA, Ong ES,
Evans RM (March 1982). "Calcitonin mRNA polymorphism:...
- 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"...
