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Эта публикация цитируется в 10 научных статьях (всего в 10 статьях)
Einstein Gravity, Lagrange–Finsler Geometry, and Nonsymmetric Metrics
Sergiu I. Vacaruab a Faculty of Mathematics, University "Al. I. Cuza" Iasi, 700506, Iasi, Romania
b The Fields Institute for Research in Mathematical Science, 222 College Street, 2d Floor, Toronto, M5T 3J1, Canada
Аннотация:
We formulate an approach to the geometry of Riemann–Cartan spaces provided with nonholonomic distributions defined by generic off-diagonal and nonsymmetric metrics inducing effective nonlinear and affine connections. Such geometries can be modelled by moving nonholonomic frames on (pseudo) Riemannian manifolds and describe various types of nonholonomic Einstein, Eisenhart–Moffat and Finsler–Lagrange spaces with connections compatible to a general nonsymmetric metric structure. Elaborating a metrization procedure for arbitrary distinguished connections, we define the class of distinguished linear connections which are compatible with the nonlinear connection and general nonsymmetric metric structures. The nonsymmetric gravity theory is formulated in terms of metric compatible connections. Finally, there are constructed such nonholonomic deformations of geometric structures when the Einstein and/or Lagrange–Finsler manifolds are transformed equivalently into spaces with generic local anisotropy induced by nonsymmetric metrics and generalized connections. We speculate on possible applications of such geometric methods in Einstein and generalized theories of gravity, analogous gravity and geometric mechanics.
Ключевые слова:
nonsymmetric metrics; nonholonomic manifolds; nonlinear connections; Eisenhart–Lagrange spaces; generalized Riemann–Finsler geometry.
Поступила: 24 июня 2008 г.; в окончательном варианте 13 октября 2008 г.; опубликована 23 октября 2008 г.
Образец цитирования:
Sergiu I. Vacaru, “Einstein Gravity, Lagrange–Finsler Geometry, and Nonsymmetric Metrics”, SIGMA, 4 (2008), 071, 29 pp.
Образцы ссылок на эту страницу:
https://www.mathnet.ru/rus/sigma324 https://www.mathnet.ru/rus/sigma/v4/p71
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