Analysis of 2+1 diffusive-dispersive PDE arising in river braiding

Abstract

We present local existence and uniqueness results for the following 2+1 dispersive diffusive equation due to P. Hall arising in modeling of river braiding: uyyt - γ uxxx -α uyyyy - β uyy + (u2 )xyy = 0 for (x,y) ∈ [0, 2π] × [0, π], t> 0, with boundary condition uy=0=uyyy at y=0 and y=π and 2π periodicity in x, using a contraction mapping argument in a Bourgain-type space Ts,b. We also show that the energy \| u \|2L2 and cumulative dissipation ∫0t \| uy \|L22 dt are globally controlled in time.