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- ...structure]]: this kind of manifold is also referred as '''almost Hermitian Finsler manifold'''.<ref>See {{harv|Ichijyō|1988|p=6}}.</ref> ...ifold]]s, "Struttura di Finsler quasi Hermitiana":<ref>"''Almost Hermitian Finsler structure''": see {{harv|Rizza|1962b|pp=271, 273–274}} and {{harv|Rizza|19 ...8 KB (1,008 words) - 04:18, 28 May 2024
- In geometry of [[normed space]]s, the '''Holmes–Thompson volume''' is a notion of [[mea ==Volume in Finsler manifolds== ...9 KB (1,428 words) - 21:56, 23 October 2022
- In mathematics, the '''Besicovitch inequality''' is a [[Geometry|geometric inequality]] relating volume of a set and distances between certa Consider the n-dimensional cube <math>[0,1]^n</math> with a [[Riemannian geometry|Riemannian]] metric <math>g</math>. Let ...3 KB (350 words) - 03:56, 20 September 2024
- In elementary geometry, a [[quadrilateral]] whose diagonals are perpendicular and of equal length ...esulting quadrilateral has a midsquare can be seen as an instance of the [[Finsler–Hadwiger theorem]].{{r|finhad}} The two foci and the two diagonal midpoints ...7 KB (972 words) - 08:18, 13 February 2025
- *[[Synthetic differential geometry]] *{{citation|title=Handbook of Finsler geometry|first=P. L. |last=Antonelli|author-link=Peter L. Antonelli|publisher=Spring ...3 KB (475 words) - 20:12, 4 March 2024
- The '''canonical flip'''<ref>P.Michor. ''Topics in Differential Geometry,'' American Mathematical Society, 2008.</ref> is a smooth involution ''j'': ...J. Fisher and H. Turner Laquer, Second Order Tangent Vectors in Riemannian Geometry, J. Korean Math. Soc. 36 (1999), No. 5, pp. 959-1008</ref> Indeed, there is ...10 KB (1,609 words) - 09:43, 27 February 2024
- The physical geometry, as seen by particles, represents the [[Finsler geometry]]–Randers type: ...6 KB (951 words) - 05:22, 12 February 2024
- In [[mathematics]] and especially [[complex geometry]], the '''Kobayashi metric''' is a [[pseudometric space|pseudometric]] intr This is the beginning of a strong connection between complex analysis and the geometry of negative curvature. For any [[complex analytic space|complex space]] ''X ...18 KB (2,467 words) - 13:14, 8 November 2023
- *{{Citation | last1=Chu | first1=Cho-Ho | title=Siegel domains over Finsler symmetric cones | year=2021 | journal=[[J. reine angew. Math.]]| volume=202 *{{Citation | last1=Piatetski-Shapiro | first1=I. I. | title=Geometry of homogeneous domains and the theory of automorphic functions. The solutio ...8 KB (1,178 words) - 21:32, 11 November 2024
- *[[Differential geometry]]}} ...ex variables|complex analysis of several variables]] and in [[differential geometry]]: he is known for his contribution to [[hypercomplex analysis]], notably f ...47 KB (6,156 words) - 04:11, 15 November 2024
- The controversy started with [[Hilbert's axioms|Hilbert's axiomatization of geometry]] in the late 1890s. In his biography of [[Kurt Gödel]], [[John W. Dawson, ...oort: Brouwer (1923b) p. 335.</ref>. In the late 1890s Hilbert axiomatized geometry.<ref>Breger states that "Modern mathematics starts with Hilbert's ''Grundla ...30 KB (4,543 words) - 02:36, 13 February 2025