Добірка наукової літератури з теми "L-Gauss transform"
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Статті в журналах з теми "L-Gauss transform":
Duijndam, A. J. W., and M. A. Schonewille. "Nonuniform fast Fourier transform." GEOPHYSICS 64, no. 2 (March 1999): 539–51. http://dx.doi.org/10.1190/1.1444560.
Chen, Xuan, Pei Dang, and Weixiong Mai. "Lp$$ {L}^p $$‐theory of linear canonical transforms and related uncertainty principles." Mathematical Methods in the Applied Sciences, January 28, 2024. http://dx.doi.org/10.1002/mma.9920.
David, Chantal, and Ahmet M. Güloğlu. "One-Level Density and Non-Vanishing for Cubic L-Functions Over the Eisenstein Field." International Mathematics Research Notices, September 6, 2021. http://dx.doi.org/10.1093/imrn/rnab240.
Koumbem, Windé Nongué Daniel, Issaka Ouédraogo, Noufou Bagaya, and Pelega Florent Kieno. "Thermal Behavior of the Natural Convection of Air Confined in a Trapezoidal Cavity." Current Journal of Applied Science and Technology, June 7, 2021, 69–80. http://dx.doi.org/10.9734/cjast/2021/v40i1231382.
Дисертації з теми "L-Gauss transform":
Sieuzac, Romain. "Sur les g-hérissons de l'espace hyperbolique et de l'hyper-sphère, ainsi que leurs transformés de L-Gauss." Electronic Thesis or Diss., CY Cergy Paris Université, 2023. http://www.theses.fr/2023CYUN1272.
The concept of hedgeho was introduced by R.Langevin, G.Levitt, and H.Rosenberg, representing the geometric realization of formal differences of convex bodies in Euclidean space. Subsequently, Y.Martinez-Maure extensively developed the hedgehog theory, allowing him, among other things, to address the problem of A.D.Alexandrov's conjecture by providing a counterexample in 2001. Additionally, relations known for convex bodies, particularly the Minkowski inequalities and isoperimetric inequalities, are observed within the set of hedgehogs. This leads to the emergence of the notion of marginally trapped hedgehog, which refers to surfaces that are marginally trapped in the Lorentz-Minkowski space, possessing properties corresponding to the concept of hedgehog.The objective of this thesis is to explore the notion of marginally trapped hedgehogs within Lorentz spaces where the intrinsic curvature is non-zero. It was therefore essential to define the concept of hedgehogs in hyperbolic space and on the hypersphere, where we have particularly studied their correspondence with the notions of g-convexity and h-convexity. In this context, we introduce the idea of g-hedgehog, examining its coherence and compatibility with the hedgehogs in Euclidean space, and which must meet the constraint of defining their L-Gauss transformation. This enables us to define marginally trapped g-hedgehogs, which are surfaces marginally trapped in Lorentz spaces H^3 × R and S^3 × R, with properties aligning well with g-hedgehogs in hyperbolic space and on the hypersphere. However, it's crucial to note that not all geometric characteristics of marginally trapped hedgehogs in the Lorentz-Minkowski space are transferable to marginally trapped g-hedgehogs, significantly constraining our approach