Random fractional kinematic wave equations of overland flow: The HPM solutions and applications

IF 5.9 1区地球科学 Q1 ENGINEERING, CIVIL

Journal of Hydrology Pub Date : 2024-10-26 DOI:10.1016/j.jhydrol.2024.132234

Ninghu Su , Fengbao Zhang

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引用次数: 0

Abstract

This paper presents new findings from analyses of a random fractional kinematic wave equation (rfKWE) for overland flow. The rfKWE is featured with orders of temporal and spatial fractional derivatives and with the roughness parameter, the effective rainfall intensity and infiltration rate as random variables. The new solutions are derived with the aid of a numerical method named the homotopy perturbation method (HPM) and approximate solutions are presented for different situations. The solutions are evaluated with data from overland flow flumes with simulated rainfall in the laboratory. The results suggest that on an infiltrating surface the temporal nonlocality of overland flow represented by the temporal order of fractional derivatives diminishes over time while the spatial nonlocality manifested by the spatial order of fractional derivatives continue if there is overland flow. It shows that the widely used unit discharge-height relationship is a special case of the solution of the rfKWE. Procedures are demonstrated for determining the fractional roughness coefficient,

n_{f}

, the order of spatial fractional derivatives,

ρ

, and the steady-state infiltration rate during the overland flow,

A_{s}

. The analyses of the data show that the mean spatial order of fractional derivatives is

ρ = 1.25

, the mean flow pattern parameter

m = 1.50

, and the mean fractional roughness coefficient is

n_{f} = 0.002

which is smaller than the conventional roughness coefficient,

n = 0.108

. With these average values of the parameters and their standard deviations, simulations were performed to demonstrate the use of the methods, which is also a comparison of the classic KWE and rfKWE models.

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陆地流的随机分数运动波方程：HPM 解法及应用

本文介绍了对陆地流的随机分数运动波方程（rfKWE）进行分析后得出的新发现。rfKWE 具有时间和空间分数导数阶数，粗糙度参数、有效降雨强度和渗透率为随机变量。借助同调扰动法（HPM）这一数值方法得出了新的解，并给出了不同情况下的近似解。利用实验室中模拟降雨的陆上水槽数据对这些解法进行了评估。结果表明，在渗透面上，如果存在陆地流，以分数导数的时间阶数为代表的陆地流时间非局部性会随着时间的推移而减弱，而以分数导数的空间阶数为代表的空间非局部性则会继续存在。这表明，广泛使用的单位排水量-高度关系是 rfKWE 解法的一个特例。演示了确定分项粗糙度系数 nf、空间分项导数阶数 ρ 和陆流过程中的稳态渗透率 As 的程序。数据分析结果表明，平均空间分数导数阶数为 ρ=1.25，平均流型参数 m=1.50，平均分数粗糙度系数 nf=0.002，小于常规粗糙度系数 n=0.108。利用这些参数的平均值及其标准偏差进行了模拟，以证明这些方法的使用，这也是对经典 KWE 模型和 rfKWE 模型的比较。

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来源期刊

Journal of Hydrology 地学-地球科学综合

CiteScore

11.00

自引率

12.50%

发文量

1309

审稿时长

7.5 months

期刊介绍： The Journal of Hydrology publishes original research papers and comprehensive reviews in all the subfields of the hydrological sciences including water based management and policy issues that impact on economics and society. These comprise, but are not limited to the physical, chemical, biogeochemical, stochastic and systems aspects of surface and groundwater hydrology, hydrometeorology and hydrogeology. Relevant topics incorporating the insights and methodologies of disciplines such as climatology, water resource systems, hydraulics, agrohydrology, geomorphology, soil science, instrumentation and remote sensing, civil and environmental engineering are included. Social science perspectives on hydrological problems such as resource and ecological economics, environmental sociology, psychology and behavioural science, management and policy analysis are also invited. Multi-and interdisciplinary analyses of hydrological problems are within scope. The science published in the Journal of Hydrology is relevant to catchment scales rather than exclusively to a local scale or site.