Abstract
In this paper, we demonstrate the existence of shape-preserving (self-similar) delta. We focus our study on a Gilbert-type delta growing by the sediment discharged at the river mouth. The evolving velocity of the shoreline depends on its local geometrical configuration including the water depth, repose angle, and curvature. Linear analysis of this local model suggests that when the sediment supply to the shoreline front can be maintained at a constant value, unstable growth occurs for adverse bathymetry (back-tilted basement) and there exists a critical water depth that leads to a self-similar evolution. A novel nonlinear analysis based on a rescaling idea reveals that there exists a critical flux Jc at the shoreline such that a desired shoreline shape can be achieved and maintained self-similarly independent of the water depth information, though the critical flux Jc may depend on the water depth. We then develop a semi-implicit numerical method to investigate the nonlinear dynamic of the shoreline. Our numerical results are in excellent agreement with the linear theory when the shape perturbation is small, and confirm that in the nonlinear regime the shoreline may evolve self-similarly under Jc. In particular, we demonstrate that a prescribed shoreline morphology can be achieved by a well-designed Jc. The existence of shape-preserving growing delta goes beyond the well known dynamical patterns and highlights the feasibility of shape control.
Original language | English (US) |
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Article number | 112967 |
Journal | Journal of Computational and Applied Mathematics |
Volume | 380 |
DOIs | |
State | Published - Dec 15 2020 |
Bibliographical note
Publisher Copyright:© 2020 Elsevier B.V.
Keywords
- Delta progradation
- Self-similar
- Shape control
- Unstable growth