论文信息 - Comparative analysis for pair of dynamical systems, one of which is Lagrangian

Comparative analysis for pair of dynamical systems, one of which is Lagrangian

It is known that some equations of differential geometry are derived from variational principle in form of Euler-Lagrange equations. The equations of geodesic flow in Riemannian geometry is an example. Conversely, having Lagrangian dynamical system in a manifold, one can consider it as geometric equipment of this manifold. Then properties of other dynamical systems can be studied relatively as compared to this Lagrangian one. This gives fruitful analogies for generalization. In present paper theory of normal shift of hypersurfaces is generalized from Riemannian geometry to the geometry determined by Lagrangian dynamical system. Both weak and additional normality equations for this case are derived.

R. Sharipov

[1] R. Sharipov. Normal shift in general Lagrangian dynamics , 2001, math/0112089.

[2] R. Sharipov. Dynamical systems admitting normal shift and wave equations , 2001, math/0108158.

[3] R. Sharipov. A note on Newtonian, Lagrangian and Hamiltonian dynamical systems in Riemannian manifolds , 2001, math/0107212.

[4] R. Sharipov. First problem of globalization in the theory of dynamical systems admitting the normal shift of hypersurfaces , 2001, math/0101150.

[5] R. Sharipov. Newtonian normal shift in multidimensional Riemannian geometry , 2000, math/0006125.

[6] R. Sharipov. On the solutions of weak normality equations in multidimensional case , 2000, math/0012110.

[7] A. Boldin. Two-dimensional dynamical systems admitting the normal shift , 2000, math/0011134.

[8] R. Sharipov. Newtonian Dynamical Systems Admitting Normal Blow-Up of Points , 2000, math/0008081.

[9] R. Sharipov. Dynamical systems admitting the normal shift , 1993, math/0002202.

[10] A. Boldin,et al. Dynamical Systems Accepting the Normal Shift , 1993, solv-int/9404002.

[11] V. Arnold. Mathematical Methods of Classical Mechanics , 1974 .