The comparative index and transformations of linear Hamiltonian differential systems

In this paper we investigate mutual oscillatory behaviour of two linear differential Hamiltonian systems related via symplectic transformations. The main result extends our previous results in [30], where we presented new explicit relations connecting the multiplicities of proper focal points of conjoined bases Y(t) of the Hamiltonian system and the transformed conjoined bases Y˜(t)=R−1(t)Y(t). In the present paper we omit restrictions on the symplectic transformation matrix R(t) concerning the constant rank of its components. As consequences of the main result we prove generalized reciprocity principles which formulate new sufficient conditions for R(t) concerning preservation of (non)oscillation of the abnormal Hamiltonian systems as t → ∞. The main tool of the paper is the comparative index theory for discrete symplectic systems implemented into the continuous case.

[1]  Y. Eliseeva Comparative index for solutions of symplectic difference systems , 2009 .

[2]  M. Bohner,et al.  Trigonometric Transformations of Symplectic Difference Systems , 2000 .

[3]  C. Ahlbrandt Equivalent boundary value problems for self-adjoint differential systems , 1971 .

[4]  Ondrej Doslý,et al.  Discrete oscillation theorems and weighted focal points for Hamiltonian difference systems with nonlinear dependence on a spectral parameter , 2015, Appl. Math. Lett..

[5]  O. Doslý On some aspects of the Bohl transformation for Hamiltonian and symplectic systems , 2017 .

[6]  P. Hartman Ordinary Differential Equations , 1965 .

[7]  M. Bohner,et al.  Oscillation and spectral theory for linear Hamiltonian systems with nonlinear dependence on the spectral parameter , 2012 .

[8]  Charles R. Johnson,et al.  Complementary bases in symplectic matrices and a proof that their determinant is one , 2006 .

[9]  Julia Elyseeva,et al.  On symplectic transformations of linear Hamiltonian differential systems without normality , 2017, Appl. Math. Lett..

[10]  On transformations of self-adjoint linear differential systems and their reciprocals , 1985 .

[11]  Julia Elyseeva Generalized oscillation theorems for symplectic difference systems with nonlinear dependence on spectral parameter , 2015, Appl. Math. Comput..

[12]  R. Hilscher Sturmian theory for linear Hamiltonian systems without controllability , 2011 .

[13]  W. Reid A Prüfer transformation for differential systems. , 1958 .

[14]  O. Doslý,et al.  An oscillation criterion for discrete trigonometric systems , 2015 .

[15]  A transformation for symplectic systems and the definition of a focal point , 2004 .

[16]  R. Hilscher,et al.  Linear Hamiltonian difference systems: Transformations, recessive solutions, generalized reciprocity , 1999 .

[17]  J. Elyseeva Generalized reciprocity principle for discrete symplectic systems , 2015 .

[18]  Martin Bohner,et al.  Disconjugacy and Transformations for Symplectic Systems , 1997 .

[19]  Zhaowen Zheng Linear transformation and oscillation criteria for Hamiltonian systems , 2007 .

[20]  A. A. Abramov A modification of one method for solving nonlinear self-adjoint eigenvalue problems for hamiltonian systems of ordinary differential equations , 2011 .

[21]  C. H. Rasmussen Oscillation and asymptotic behavior of systems of ordinary linear differential equations , 1979 .

[22]  Comparative index and Sturmian theory for linear Hamiltonian systems , 2017 .

[23]  Markus Wahrheit Eigenvalue Problems and Oscillation of Linear Hamiltonian Systems , 2007 .

[24]  R. Hilscher,et al.  Rayleigh principle for linear Hamiltonian systems without controllability , 2012 .

[25]  J. Elyseeva Comparison theorems for conjoined bases of linear Hamiltonian differential systems and the comparative index , 2016 .

[26]  DEFINITENESS OF QUADRATIC FUNCTIONALS , 2003 .

[27]  J. Elyseeva Transformations and the number of focal points for conjoined bases of symplectic difference systems , 2009 .

[28]  Y. Eliseeva Comparison theorems for symplectic systems of difference equations , 2010 .

[29]  J. Barrett A Prüfer transformation for matrix differential equations , 1957 .