DOŠLÝ, Ondřej, Roman HILSCHER and Vera ZEIDAN. Nonnegativity of discrete quadratic functionals corresponding to symplectic difference systems. Linear Algebra and its Applications. USA: Elsevier Science, 2003, vol. 375, 1.12.2003, p. 21-44. ISSN 0024-3795.
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Basic information
Original name Nonnegativity of discrete quadratic functionals corresponding to symplectic difference systems
Authors DOŠLÝ, Ondřej (203 Czech Republic), Roman HILSCHER (203 Czech Republic, guarantor) and Vera ZEIDAN (840 United States of America).
Edition Linear Algebra and its Applications, USA, Elsevier Science, 2003, 0024-3795.
Other information
Original language English
Type of outcome Article in a journal
Field of Study 10101 Pure mathematics
Country of publisher United States of America
Confidentiality degree is not subject to a state or trade secret
Impact factor Impact factor: 0.656
RIV identification code RIV/00216224:14310/03:00008259
Organization unit Faculty of Science
UT WoS 000186340700003
Keywords in English Symplectic difference system; Discrete quadratic functional; Nonnegativity; Positivity; Focal point; Conjoined basis; Riccati difference equation; Linear Hamiltonian difference system
Tags conjoined basis, discrete quadratic functional, focal point, linear Hamiltonian difference system, Nonnegativity, Positivity, Riccati difference equation, Symplectic difference system
Tags International impact, Reviewed
Changed by Changed by: prof. RNDr. Roman Šimon Hilscher, DSc., učo 1023. Changed: 26/6/2009 07:17.
Abstract
We study the nonnegativity of quadratic functionals with separable endpoints which are related to the discrete symplectic system (S). In particular, we characterize the nonnegativity of these functionals in terms of (i) the focal points of the natural conjoined basis of (S) and (ii) the solvability of an implicit Riccati equation associated with (S). This result is closely related to the kernel condition for the natural conjoined basis of (S). We treat the situation when this kernel condition is possibly violated at a certain index. To accomplish this goal, we derive a new characterization of the set of admissible pairs (sequences) that does not require the validity of the above mentioned kernel condition. Finally, we generalize our results to the variable stepsize case.
Links
GA201/01/0079, research and development projectName: Kvalitativní teorie řešení diferenčních rovnic
Investor: Czech Science Foundation, Qualitative theory of solutions of difference equations
MSM 143100001, plan (intention)Name: Funkcionální diferenciální rovnice a matematicko-statistické modely
Investor: Ministry of Education, Youth and Sports of the CR, Functional-differential equations and mathematical-statistical models
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