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We prove the asymptotic stability in H¹ (R) of the family of solitary waves for the Benjamin-Bona-Mahony equation, (1-²ₓ) uₜ+ (u+u²) ₓ=0. We prove that a solution initially close to a solitary wave, once conveniently translated, converges weakly in H¹ (R), as time goes to infinity, to a possibly different solitary wave. The proof is based on a Liouville type theorem for the flow close to the solitary waves, and makes an extensive use of a monotonicity property.
Khaled El Dika (Sat,) studied this question.