Well-posedness and Critical Index Set of the Cauchy Problem for the Coupled KdV-KdV Systems on T

Abstract

Studied in this paper is the well-posedness of the Cauchy problem for the coupled KdV-KdV systems \[ ut+a1uxxx = c11uux+c12vvx+d11uxv+d12uvx, u(x,0)= u0(x) \] \[ vt+a2vxxx= c21uux+c22vvx +d21uxv+d22uvx, v(x,0)=v0(x)\] posed on the torus T in the spaces \[ Hs1:=Hs0 (T)× Hs0 (T), Hs2:=Hs0 (T)× Hs(T), Hs3:=Hs (T)× Hs0 (T), Hs4:=Hs (T)× Hs (T).\] For k=1,2,3,4, it is shown that for given a1, a2, (cij) and (dij), there exists a unique s*k ∈ (-∞, +∞], called the critical index, such that the system is analytically well-posed in Hsk for s>s*k while the bilinear estimate, the key for the proof of the analytical well-posedness, fails if s<s*k. Viewing the critical index s*k as a function of the coefficients a1, a2, (cij) and (dij), its range Ck is called the critical index set for the analytical well-posedness of the system in the space Hsk. Invoking some classical results of Diophantine approximation in number theory, we are able to identify that \[ C1= \ -12, ∞ \ \ α: 12≤ α≤ 1 \ Cq= \ -12, -14, ∞ \ \ α: 12≤ α≤ 1 \ for q=2,3,4.\] This is in sharp contrast to the R case in which the critical index set C for the analytical well-posedness of in the space Hs (R)× Hs (R) consists of exactly four numbers: C= \ -1312, -34, 0, 34 \.