Pages that link to "Item:Q2207746"

The following pages link to Can simple KdV-type equations be derived for shallow water problem with bottom bathymetry? (Q2207746):

Displaying 9 items.

• A numerical study of variable depth KdV equations and generalizations of Camassa-Holm-like equations (Q442695) (← links)
• On the Korteweg-de Vries approximation for uneven bottoms (Q1007815) (← links)
• Uni-directional waves over slowly varying bottom. I: Derivation of a KdV- type of equation (Q1329861) (← links)
• Model order reduction strategies for weakly dispersive waves (Q2104396) (← links)
• A nonlinear formulation of radiation stress and applications to cnoidal shoaling (Q2143434) (← links)
• Weakly nonlinear waves over the bottom disturbed topography: Korteweg-de Vries equation with variable coefficients (Q2681487) (← links)
• (2+1)-dimensional KdV, fifth-order KdV, and Gardner equations derived from the ideal fluid model. Soliton, cnoidal and superposition solutions (Q6177741) (← links)
• A numerical representation of hyperelliptic KdV solutions (Q6591016) (← links)
• KdV, extended KdV, 5th-order KdV, and Gardner equations generalized for uneven bottom versus corresponding Boussinesq's equations (Q6603844) (← links)