New soliton-like solutions in sine-Gordon model with infinite discrete spectrum
by
Sergei Zykov
Institute of Metal Physics, S.Kovalevskaya str. 18, 620079, Ekaterinburg, Russia
Coauthors: Alexander B. Borisov

We present a new soliton-like solution of sine-Gordon equation. For this 'soliton' L-operator of sine-Gordon equation has infinity discrete spectrum. The dressing chain of sine-Gordon equation is considered as infinity dimension system We use boundary conditions f_n+1(x, t)=f_n(qx, t/q), \lambda_n+1=q\lambda_n related to symmetry of sine-Gordon equation (0 < q < 1). It transform the dressing chain to system of functional differential equations.

fx(x, t)+fx(qx, t/q)=q\lambdasinf(qx, t/q)-\lambdasinf(x, t)

f(x, t)+f(qx, t/q)=arcsin(q\lambdaft(qx, t/q))-arcsin(\lambdaft(x, t))

Potential u=arcsin(\lambda₀ f_{0, t})-f₀ is kink-like solution of sine-Gordon equation. L-operator for this potential has self similar spectrum in form {qⁿ\lambda₀|n=1, 2, ..}. Dynamic of potential, which was studied by numerical calculation, is discussed. The work was partially supported by RFBR Grant N 97-01-00431.

Date received: July 8, 1998