A Bilinear Approach to the Discrete Painleve I Equations
スポンサーリンク
概要
- 論文の詳細を見る
We present the list of all known to date difference and q-discrete forms of the Painleve I equations. A new, derived here for the first time, zero-parameter, q-discrete Painleve equation is also given. We present interrelations between some of these equations, whenever they exist, in the form of Miura transformations. Finally we give the bilinearisation of these systems.
- 社団法人日本物理学会の論文
- 2002-02-15
著者
-
Ramani A.
CPT, Ecole Polytechnique
-
Ramani A.
Cpt Ecole Polytechnique Cnrs
-
Grammaticos B.
Gmpib Universite Paris Vii
-
TAMIZHMANI T.
GMPIB, Universite Paris VII
-
CARSTEA A.S.
CPT, Ecole Polytechnique, CNRS
-
TAMIZHMANI K.M.
Department of Mathematics, Pondicherry University
-
Carstea A.s.
Cpt Ecole Polytechnique Cnrs:(permanent Address) Institute Of Physics And Nuclear Engineering Depart
-
Tamizhmani K.m.
Department Of Mathematics Pondicherry University
-
Tamizhmani T.
Gmpib Universite Paris Vii:(permanent Address) Dept.of Mathematics Avvaiyar Government College For W
関連論文
- An affine Weyl group approach to the 8-parameter discrete Painleve equation (Analysis of Painleve equations)
- A Bilinear Approach to the Discrete Painleve I Equations
- CONTINUOUS AND SEMI-DISCRETE TRILINEAR EQUATIONS: INVESTIGATING THEIR INTEGRABILITY(State of art and perspectives of studies on nonlinear integrable systems)
- Addendum to the Infinite-Dimensional Lie Algebraic Structure and the Symmetry Reduction of a Nonlinear Higher-Dimensional Equation
- Master Symmetries from Lax Operators for Certain Lattice Soliton Hierarchies : General Physics
- The Infinite-Dimensional Lie Algebraic Structure and the Symmetry Reduction of a Nonlinear Higher-Dimensional Equation