Normal forms for pseudo-Riemannian 2-dimensional metrics whose geodesic flows admit integrals quadratic in momenta

Bolsinov Alexey V.; Matveev Vladimir S.; Pucacco Giuseppe

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Normal forms for pseudo-Riemannian 2-dimensional metrics whose geodesic flows admit integrals quadratic in momenta

机译：伪黎曼二维度量的范式，其测地线流动允许矩量为二次方积分

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We discuss pseudo-Riemannian metrics on 2-dimensional manifolds such that the geodesic flow admits a nontrivial integral quadratic in velocities. We construct local normal forms of such metrics. We show that these metrics have certain useful properties similar to those of Riemannian Liouville metrics, namely: they admit geodesically equivalent metrics; one can use them to construct a large family of natural systems admitting integrals quadratic in momenta; the integrability of such systems can be generalized to the quantum setting; these natural systems are integrable by quadratures. Crown Copyright

机译：我们讨论二维流形上的伪黎曼度量，以使测地线流可以接受速度的非平凡积分二次。我们构建此类指标的本地范式。我们证明这些度量具有某些与黎曼利维尔度量相似的有用属性，即：它们接受大地测量等效度量;可以使用它们来构建一个大的自然系统家族，该系统允许在矩量方面二次方积分。这种系统的可集成性可以推广到量子环境。这些自然系统是可以积分的。皇冠版权

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《Journal of geometry and physics》 |2009年第7期|共15页
作者
Bolsinov Alexey V.; Matveev Vladimir S.; Pucacco Giuseppe;
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原文格式 PDF
正文语种 eng
中图分类 513LbB017;
关键词
Integrable systems; Geodesically equivalent metrics; Separability by quadrature;

机译：可积系统;地学等效的度量;正交可分性;

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专利

1. Normal forms for pseudo-Riemannian 2-dimensional metrics whose geodesic flows admit integrals quadratic in momenta [J] . Bolsinov Alexey V., Matveev Vladimir S., Pucacco Giuseppe Journal of geometry and physics . 2009,第7期

机译：伪黎曼二维度量的范式，其测地线流动允许矩量为二次方积分
2. The geodesic flow of a generic metric does not admit nontrivial integrals polynomial in momenta [J] . Kruglikov Boris, Matveev Vladimir S. Nonlinearity . 2016,第6期

机译：通用度量的测地线不允许矩量中的非平凡多项式多项式
3. LOCAL NORMAL FORMS FOR GEODESICALLY EQUIVALENT PSEUDO-RIEMANNIAN METRICS [J] . Bolsinov Alexey V., Matveev Vladimir S. Transactions of the American Mathematical Society . 2015,第9期

机译：几何上等价的伪-黎曼矩阵的局部范式
4. A new natural Hamiltonian system on T*S2 admitting an integral of degree 3 in momenta [C] . Holger R. Dullin, Vladimir S. Matveev International Workshop on Global Analysis . 2004

机译：T * S2上的一个新的天然汉密尔顿系统，承认在动态中的3学位的整体
5. Improving the conformal metric: Geodesic deformable models for medical image analysis. [D] . Wyatt, Christopher Lee. 2002

机译：改进保形指标：用于医学图像分析的测地线可变形模型。
6. A VECTOR MOMENTA FORMULATION OF DIFFEOMORPHISMS FOR IMPROVED GEODESIC REGRESSION AND ATLAS CONSTRUCTION [O] . Nikhil Singh, Jacob Hinkle, Sarang Joshi, -1

机译：改进后的测地回归和阿特拉斯构造的地貌形态学的矢量动量公式
7. Normal forms for pseudo-Riemannian 2-dimensional metrics whose geodesic flows admit integrals quadratic in momenta [O] . Bolsinov, AV, Matveev, VS, Pucacco, G 2009

机译：伪黎曼二维度量的范式，其测地线流动允许矩量为二次方积分
8. On Conformally Related Metric Spaces One of Which Admits an Irrotational Isometry [R] . Edelen, D. G. B. 1964

机译：关于共形相关的度量空间，其中一个允许非旋转等距

Normal forms for pseudo-Riemannian 2-dimensional metrics whose geodesic flows admit integrals quadratic in momenta

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