Local well‐posedness for a type of periodic fifth‐order Korteweg–de Vries equations without nonlinear dispersive term

Abstract: We consider the Cauchy problem of the fifth‐order Korteweg–de Vries (KdV) equations without nonlinear dispersive term ∂tu−∂x5u+b0u∂xu+b1∂xfalse(∂xufalse)2=0,0.30emfalse(t,xfalse)∈ℝ×𝕋. Recently, Kappeler‐Molnar (2018) proved that the fifth‐order KdV equation with nonlinear dispersive term and Hamiltonian structure is globally well‐posed in Hsfalse(𝕋false) with s ≥ 0. Without the nonlinear dispersive term, Equation () is not integrable, and Kappeler–Molnar's approach is not valid. Using the idea of modifyi… Show more