Eigenvalue theory for time scale symplectic systems depending nonlinearly on spectral parameter

Abstract In this paper we develop the eigenvalue theory for general time scale symplectic systems, in which the dependence on the spectral parameter λ is allowed to be nonlinear. At the same time we do not impose any controllability or strict normality assumptions. We prove the oscillation theorems for eigenvalue problems with Dirichlet, separated, and jointly varying endpoints, including the periodic boundary conditions. We also allow the boundary conditions depending on the spectral parameter. Our new theory generalizes and unifies recently published results on continuous-time linear Hamiltonian systems and discrete symplectic systems with nonlinear dependence on λ and on time scale symplectic systems with linear dependence on λ . The results of this paper are also new in the special case of linear Hamiltonian systems with variable endpoints, as well as for Sturm–Liouville dynamic equations.

[1]  V. Zeidan,et al.  Riccati equations for abnormal time scale quadratic functionals , 2008 .

[2]  DEFINITENESS OF QUADRATIC FUNCTIONALS , 2003 .

[3]  Vera Zeidan,et al.  Hamilton-Jacobi theory over time scales and applications to linear-quadratic problems , 2012 .

[4]  Werner Kratz,et al.  Quadratic Functionals in Variational Analysis and Control Theory , 1995 .

[5]  V. Zeidan,et al.  Reid Roundabout Theorems for Time Scale Symplectic Systems , 2010 .

[6]  Roman Simon Hilscher,et al.  Picone type identities and definiteness of quadratic functionals on time scales , 2009, Appl. Math. Comput..

[7]  Roman Simon Hilscher,et al.  Oscillation theorems and Rayleigh principle for linear Hamiltonian and symplectic systems with general boundary conditions , 2012, Appl. Math. Comput..

[8]  R. Hilscher,et al.  Perturbation of time scale quadratic functionals with variableendpoints , 2007 .

[9]  Optimality Conditions for Time Scale Variational Problems , 2008 .

[10]  Vera Zeidan,et al.  Applications of time scale symplectic systems without normality , 2008 .

[11]  Werner Kratz,et al.  Oscillation and spectral theory for symplectic difference systems with separated boundary conditions , 2010 .

[12]  N. Higham LINEAR ALGEBRA (Pure and Applied Mathematics) , 1999 .

[13]  Petr Zemánek,et al.  Weyl-Titchmarsh Theory for Time Scale Symplectic Systems on Half Line , 2011 .

[14]  Vera Zeidan,et al.  Weak maximum principle and accessory problem for control problems on time scales , 2009 .

[15]  Roman Šimon Hilscher,et al.  Riccati inequality and other results for discrete symplectic systems , 2006 .

[16]  V. Zeidan,et al.  Dynamic Systems and Applications 16 (2007) 451-480 LEGENDRE, JACOBI, AND RICCATI TYPE CONDITIONS FOR TIME SCALE VARIATIONAL PROBLEM WITH APPLICATION , 2022 .

[17]  R. Hilscher Oscillation theorems for discrete symplectic systems with nonlinear dependence in spectral parameter , 2012 .

[18]  Martin Bohner,et al.  AN EIGENVALUE PROBLEM FOR LINEAR HAMILTONIAN DYNAMIC SYSTEMS , 2005 .

[19]  Linear Hamiltonian dynamic systems on time scales: Sturmian property of the principal solution , 2001 .

[20]  A. Peterson,et al.  Dynamic Equations on Time Scales , 2001 .

[21]  V. Zeidan,et al.  Symplectic Structure of Jacobi Systems on Time Scales , 2010 .

[22]  R. Hilscher Reid Roundabout Theorem for Symplectic Dynamic Systems on Time Scales , 2001 .

[23]  Martin Bohner,et al.  Hamiltonian Systems on Time Scales , 2000 .

[24]  Martin Bohner CALCULUS OF VARIATIONS ON TIME SCALES , 2004 .

[25]  Vera Zeidan,et al.  Differentiation of solutions of dynamic equations on time scales with respect to parameters , 2009 .

[26]  Vera Zeidan,et al.  Time scale embedding theorem and coercivity of quadratic functionals , 2008 .

[27]  V. Zeidan,et al.  Multiplicities of focal points for discrete symplectic systems: revisited , 2009 .

[28]  S. Hilger Analysis on Measure Chains — A Unified Approach to Continuous and Discrete Calculus , 1990 .

[29]  Roman Simon Hilscher,et al.  A Generalized Index Theorem for Monotone Matrix-Valued Functions with Applications to Discrete Oscillation Theory , 2013, SIAM J. Matrix Anal. Appl..

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

[31]  V. Zeidan,et al.  Time scale symplectic systems without normality , 2006 .

[32]  V. Zeidan,et al.  Eigenvalue and oscillation theorems for time scale symplectic systems , 2011 .

[33]  R. Hilscher,et al.  Disconjugacy, transformations and quadratic functionals for symplectic dynamic systems on time scales , 2001 .

[34]  김철,et al.  Legendre 기호와 암호학 , 1992 .

[35]  V. Zeidan,et al.  Rayleigh principle for time scale symplectic systems and applications , 2011 .

[36]  Adi Ben-Israel,et al.  Generalized inverses: theory and applications , 1974 .