TY - JOUR
T1 - Nonintegrability of a class of the Bianchi V I0 and V II0 models
AU - Llibre, Jaume
AU - Valls, Clàudia
PY - 2010/5/1
Y1 - 2010/5/1
N2 - The well-known Bianchi V I0 and Bianchi V II0 dynamical systems are three-dimensional differential systems which after a convenient reduction become over(x, ̇) = - x2 + (z + 1) y2, over(y, ̇) = - 4 (z + 1) + x y z, over(z, ̇) = - y z (z + 2) . In the paper of Maciejewski and Szydiowski [A.J. Maciejewski, M. Szydiowski, Bianchi cosmologies as dynamical systems, Celestial Mech. Dynam. Astronom. 73 (1999) 17-24], the authors asked about the integrability or nonintegrability of this system. Here we show that this system has no first integrals which are polynomial, rational, Darboux functions or analytic functions. Consequently this system is not integrable inside these classes of functions. © 2010 Elsevier B.V. All rights reserved.
AB - The well-known Bianchi V I0 and Bianchi V II0 dynamical systems are three-dimensional differential systems which after a convenient reduction become over(x, ̇) = - x2 + (z + 1) y2, over(y, ̇) = - 4 (z + 1) + x y z, over(z, ̇) = - y z (z + 2) . In the paper of Maciejewski and Szydiowski [A.J. Maciejewski, M. Szydiowski, Bianchi cosmologies as dynamical systems, Celestial Mech. Dynam. Astronom. 73 (1999) 17-24], the authors asked about the integrability or nonintegrability of this system. Here we show that this system has no first integrals which are polynomial, rational, Darboux functions or analytic functions. Consequently this system is not integrable inside these classes of functions. © 2010 Elsevier B.V. All rights reserved.
KW - Analytic first integrals
KW - Bianchi V I model 0
KW - Bianchi V II model 0
KW - Darboux first integrals
KW - Darboux polynomials
KW - Formal first integrals
KW - Rational first integrals
U2 - 10.1016/j.geomphys.2010.01.011
DO - 10.1016/j.geomphys.2010.01.011
M3 - Article
SN - 0393-0440
VL - 60
SP - 815
EP - 822
JO - Journal of Geometry and Physics
JF - Journal of Geometry and Physics
IS - 5
ER -