• The fractional type KdV-BBM equation is derived as a pyhsical model. • The long time existence result for the Cauchy problem for the fractional KdV-BBM equation is established. • The maximal existence time is extended beyond hyperbolic time scale by using a modified energy technique. • A Fourier pseudospectral method is proposed for the numerical investigations of solutions to the fractional KdV-BBM equation. We consider a fractional Korteweg de Vries-Benjamin Bona Mahony (KdV-BBM) type equation including both fractional dispersive terms of fractional KdV and fractional BBM equations. We aim to enhance the existence time of solutions with small initial data ∥ u 0 ∥ H N + α / 2 = ϵ from 1 ϵ to 1 ϵ 2 . The proof relies on the combination of a modified energy method with Fourier techniques. In addition, the long time existence issues are investigated numerically. Numerical observations of the lifespan give an evidence of existence of solutions beyond the hyperbolic time scale. This study provides a detailed analysis from both analytical and numerical aspects for the existence of smooth solutions.
Göksu Oruc (Tue,) studied this question.