A | B | C | D | E | F | G | H | CH | I | J | K | L | M | N | O | P | Q | R | S | T | U | V | W | X | Y | Z | 0 | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 8 | 9
In mathematics, the Heinz mean (named after E. Heinz[1]) of two non-negative real numbers A and B, was defined by Bhatia[2] as:
with 0 ≤ x ≤ 1/2.
For different values of x, this Heinz mean interpolates between the arithmetic (x = 0) and geometric (x = 1/2) means such that for 0 < x < 1/2:
The Heinz means appear naturally when symmetrizing -divergences.[3]
It may also be defined in the same way for positive semidefinite matrices, and satisfies a similar interpolation formula.[4][5]
See also
References
- ^ E. Heinz (1951), "Beiträge zur Störungstheorie der Spektralzerlegung", Math. Ann., 123, pp. 415–438.
- ^ Bhatia, R. (2006), "Interpolating the arithmetic-geometric mean inequality and its operator version", Linear Algebra and Its Applications, 413 (2–3): 355–363, doi:10.1016/j.laa.2005.03.005.
- ^ Nielsen, Frank; Nock, Richard; Amari, Shun-ichi (2014), "On Clustering Histograms with k-Means by Using Mixed α-Divergences", Entropy, 16 (6): 3273–3301, Bibcode:2014Entrp..16.3273N, doi:10.3390/e16063273, hdl:1885/98885.
- ^ Bhatia, R.; Davis, C. (1993), "More matrix forms of the arithmetic-geometric mean inequality", SIAM Journal on Matrix Analysis and Applications, 14 (1): 132–136, doi:10.1137/0614012.
- ^ Audenaert, Koenraad M.R. (2007), "A singular value inequality for Heinz means", Linear Algebra and Its Applications, 422 (1): 279–283, arXiv:math/0609130, doi:10.1016/j.laa.2006.10.006, S2CID 15032884.
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