A new result for the local well-posedness of the generalized Camassa-Holm equations in critial Besov spaces B1pp,1,1≤ p<+∞

Abstract

This paper is devoted to studying the local well-posedness (existence,uniqueness and continuous dependence) for the generalized Camassa-Holm equations in critial Besov spaces B1pp,1 with 1≤ p<+∞, which improves the previous index s> \12,1p\ or s=1p,\ p∈[1,2],\ r=1 in linb,tu-yin4. The main difficulty is to prove the uniqueness, which need to use the Moser-type inequality. To overcome the difficulty, we use the Lagrange coordinate transformation to obtain the uniqueness.