论文信息 - One symmetry does not imply integrability

One symmetry does not imply integrability

We show that Bakirov's counter-example (which had been checked by computer algebra methods up to order 53) to the conjecture that one nontrivial symmetry of an evolution equation implies infinitely many is indeed a counter-example. To prove this we use thesymbolic methodof Gel'fand–Dikii andp-adic analysis. We also formulate a conjecture to the effect that almost all equations in the family considered by Bakirov have at most finitely many symmetries. This conjecture depends on the solution of a diophantine problem, which we explicitly state.

[1] P. Olver. Applications of Lie Groups to Differential Equations , 1986 .

[2] V. Sokolov. On the symmetries of evolution equations , 1988 .

[3] K. Brown,et al. Graduate Texts in Mathematics , 1982 .

[4] F. Beukers. On a sequence of polynomials , 1997 .

[5] I. Gel'fand,et al. ASYMPTOTIC BEHAVIOUR OF THE RESOLVENT OF STURM-LIOUVILLE EQUATIONS AND THE ALGEBRA OF THE KORTEWEG-DE VRIES EQUATIONS , 1975 .

[6] Jan A. Sanders,et al. ON THE INTEGRABILITY OF HOMOGENEOUS SCALAR EVOLUTION EQUATIONS , 1998 .

[7] J. Sanders,et al. On the Integrability of Non-polynomial Scalar Evolution Equations , 2000 .

[8] Christer Lech,et al. A note on recurring series , 1953 .