On the numerical solution of involutive ordinary differential systems

We propose a method for the numerical solution of ordinary differential systems. The system is considered geometrically as a submanifold in a jet space. The solutions are then certain integral manifolds that can be computed numerically when the system has been transformed into involutive form.

[1]  S. Brendle,et al.  Calculus of Variations , 1927, Nature.

[2]  T. E. Hull,et al.  Numerical solution of initial value problems , 1966 .

[3]  M. Spivak A comprehensive introduction to differential geometry , 1979 .

[4]  Second order systems with nonlinear boundary conditions , 1977 .

[5]  J. Mawhin Stable homotopy and ordinary differential equations with nonlinear boundary conditions , 1977 .

[6]  S. Yakowitz,et al.  The Numerical Solution of Ordinary Differential Equations , 1978 .

[7]  R. Dembo,et al.  INEXACT NEWTON METHODS , 1982 .

[8]  Alcides Lins Neto,et al.  Geometric Theory of Foliations , 1984 .

[9]  W. Petryshyn Solvability of various boundary value problems for the equation x′′ = f(t,x,x′,x′′) − y , 1986 .

[10]  P. Olver Applications of Lie Groups to Differential Equations , 1986 .

[11]  P. Habets,et al.  Upper and lower solutions for second-order boundary value problems with nonlinear boundary conditions , 1986 .

[12]  F. Krogh,et al.  Solving Ordinary Differential Equations , 2019, Programming for Computations - Python.

[13]  A. Fordy APPLICATIONS OF LIE GROUPS TO DIFFERENTIAL EQUATIONS (Graduate Texts in Mathematics) , 1987 .

[14]  Ernst Hairer,et al.  The numerical solution of differential-algebraic systems by Runge-Kutta methods , 1989 .

[15]  D. Saunders The Geometry of Jet Bundles , 1989 .

[16]  Lawrence S. Kroll Mathematica--A System for Doing Mathematics by Computer. , 1989 .

[17]  Jianming Miao,et al.  General expressions for the Moore-Penrose inverse of a 2×2 block matrix , 1991 .

[18]  Charles R. Johnson,et al.  Topics in Matrix Analysis , 1991 .

[19]  Ernst Hairer,et al.  Solving Ordinary Differential Equations I: Nonstiff Problems , 2009 .

[20]  Werner C. Rheinboldt,et al.  On Impasse Points of Quasilinear Differential Algebraic Equations , 1994 .

[21]  On a class of functional boundary value problems for the equation x'' = f(t,x,x',x'',λ) , 1994 .

[22]  A. Bloch Hamiltonian and Gradient Flows, Algorithms and Control , 1995 .

[23]  Eva Rovderová Third-order boundary-value problem with nonlinear boundary conditions , 1995 .

[24]  B. Fischer Polynomial Based Iteration Methods for Symmetric Linear Systems , 1996 .

[25]  P. Kelevedjiev Solvability of two-point boundary value problems , 1996 .

[26]  W. M. Lioen,et al.  Test set for IVP solvers , 1996 .

[27]  J. Malinen Minimax control of distributed discrete time systems through spectral factorization , 1997, 1997 European Control Conference (ECC).

[28]  Jukka Tuomela,et al.  On singular points of quasilinear differential and differential-algebraic equations , 1997 .

[29]  Alberto Cabada,et al.  Existence result for the problem (p( u '))' = f(t,u,u') with periodic and Neumann boundary conditions , 1997 .