TY - JOUR
T1 - The solution of the long-wave equation for various nonlinear depth and breadth profiles in the power-law form
AU - Bayındır, Cihan
AU - Farazande, Sofi
N1 - Publisher Copyright:
© 2021 Elsevier B.V.
PY - 2021/12
Y1 - 2021/12
N2 - Long waves bring many important challenges in the ocean and coastal engineering, including but are not limited to harbor resonance and run-up. Therefore, understanding and modeling their dynamics is crucially important. Although their dynamics over various types of geometries are well-studied in the literature, the study of the geometries with power-law variations remains an open problem in this setting. With this motivation, in this paper, we derive the exact analytical solutions of the long-wave equation over nonlinear depth and breadth profiles having power-law forms given by h(x)=c1xa and b(x)=c2xc, where the parameters c1,c2,a,c are some constants. We show that for these types of power-law forms of depth and breadth profiles, the long-wave equation admits solutions in terms of Bessel functions and Cauchy–Euler series. We also derive the seiching periods and resonance conditions for these forms of depth and breadth variations. Our results can be used to investigate the long-wave dynamics and their envelope characteristics over equilibrium beach profiles, the effects of nonlinear harbor entrances and angled nonlinear seawall breadth variations in the power-law forms on these dynamics, and the effects of reconstruction, geomorphological changes, sedimentation, and dredging to harbor resonance, to the shift in resonance periods and to the seiching characteristics in lakes and barrages.
AB - Long waves bring many important challenges in the ocean and coastal engineering, including but are not limited to harbor resonance and run-up. Therefore, understanding and modeling their dynamics is crucially important. Although their dynamics over various types of geometries are well-studied in the literature, the study of the geometries with power-law variations remains an open problem in this setting. With this motivation, in this paper, we derive the exact analytical solutions of the long-wave equation over nonlinear depth and breadth profiles having power-law forms given by h(x)=c1xa and b(x)=c2xc, where the parameters c1,c2,a,c are some constants. We show that for these types of power-law forms of depth and breadth profiles, the long-wave equation admits solutions in terms of Bessel functions and Cauchy–Euler series. We also derive the seiching periods and resonance conditions for these forms of depth and breadth variations. Our results can be used to investigate the long-wave dynamics and their envelope characteristics over equilibrium beach profiles, the effects of nonlinear harbor entrances and angled nonlinear seawall breadth variations in the power-law forms on these dynamics, and the effects of reconstruction, geomorphological changes, sedimentation, and dredging to harbor resonance, to the shift in resonance periods and to the seiching characteristics in lakes and barrages.
KW - Bessel functions
KW - Equilibrium beach profiles
KW - Harbor resonance and seiching
KW - Long-waves
KW - Power-law form of depth and breadth variations
UR - http://www.scopus.com/inward/record.url?scp=85114751474&partnerID=8YFLogxK
U2 - 10.1016/j.dynatmoce.2021.101254
DO - 10.1016/j.dynatmoce.2021.101254
M3 - Article
AN - SCOPUS:85114751474
SN - 0377-0265
VL - 96
JO - Dynamics of Atmospheres and Oceans
JF - Dynamics of Atmospheres and Oceans
M1 - 101254
ER -