Sum rules for zeros of polynomials and generalized Lucas polynomials
- Author
- RICCI, P. E
La Sapienza univ., Rome, Italy - Source
Journal of mathematical physics. 1993, Vol 34, Num 10, pp 4884-4891 ; ref : 6 ref
- CODEN
- JMAPAQ
- ISSN
- 0022-2488
- Scientific domain
- Mathematics; Theoretical physics
- Publisher
- American Institute of Physics, Melville, NY
- Publication country
- United States
- Document type
- Article
- Language
- English
- Keyword (fr)
- Fonction propre Opérateur différentiel Opérateur polynomial Polynôme Représentation Règle somme Zéro
- Keyword (en)
- Eigenfunctions Differential operator Polynomial operator Polynomials Representation Sum rules Zero
- Keyword (es)
- Operador diferencial Operador polinomial Representación Cero
- Classification
- Pascal
- 001 Exact sciences and technology / 001B Physics / 001B00 General / 001B00B Mathematical methods in physics / 001B00B10 Logic, set theory, and algebra / 001B00B10N Algebraic number theory, field theory, and polynomials
- Pascal
- 001 Exact sciences and technology / 001B Physics / 001B00 General / 001B00B Mathematical methods in physics / 001B00B30 Function theory, analysis / 001B00B30T Operator theory
- Pacs
- 0230T Operator theory
- Discipline
- Mathematics Theoretical physics
- Origin
- Inist-CNRS
- Database
- PASCAL
- INIST identifier
- 3870399
Sauf mention contraire ci-dessus, le contenu de cette notice bibliographique peut être utilisé dans le cadre d’une licence CC BY 4.0 Inist-CNRS / Unless otherwise stated above, the content of this bibliographic record may be used under a CC BY 4.0 licence by Inist-CNRS / A menos que se haya señalado antes, el contenido de este registro bibliográfico puede ser utilizado al amparo de una licencia CC BY 4.0 Inist-CNRS
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DOI
10.1063/1.530329 
https://dx.doi.org/10.1063/1.530329
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