用高斯积分法和解析积分法计算自适应面板网格上带有恢复力和弗劳德-克雷洛夫力的陡波中的船舶运动

IF 2.5 3区 工程技术
Malwin Wermbter, Moustafa Abdel-Maksoud
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引用次数: 0

摘要

脉冲响应法是计算船舶抗浪性能的常用方法。本文通过对面板压力的恒定评估以及高斯四则运算和分析积分进行了恢复和 Froude-Krylov 计算。应用的面板网格通过基于法向量条件的自适应算法进行粗化。各种方法的比较基于网格收敛性研究,随后在波浪中的固定杜伊斯堡试验案例中对计算流体动力学(CFD)结果进行了受力验证。与顶波、斜波和随波实验结果的验证表明,所有积分方法都是精确的。精确积分法在某些情况下对数值敏感。高斯正交精度很高,但由于几何精度对力幅的影响比积分方法更大,因此额外的努力并没有好处。自适应网格粗化缩短了模拟时间,其精确度可达到面板长度接近波长的水平。在研究的弗劳德数为 0.05 时,增加的阻力显示出更高的不确定性水平,这适用于数值方法和模型试验的结果。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Calculation of ship motions in steep waves with restoring and Froude-Krylov forces on an adaptive panel mesh with Gauss and analytic integration methods

The impulse response method is a frequently used method to calculate ship seakeeping behavior. In this paper, the restoring and Froude-Krylov calculation is conducted with constant evaluation of panel pressures as well as Gauss quadrature and an analytical integration. The applied panel grid is coarsened by an adaptive algorithm which is based on a normal vector condition. The comparison of methods is based on grid convergence studies which are followed by a verification of forces with computational fluid dynamics (CFD) results on the fixed duisburg test case in waves. Validations with experimental results in head, oblique and following waves show that all integration methods are accurate. The exact integration is numerically sensitive in some cases. Gauss quadrature is highly accurate; however, the additional effort is not beneficial since the geometrical accuracy has-stronger influence on the force amplitudes than the integration method. Adaptive grid coarsening reduces the simulation time and is accurate up to a level, where the panel length comes close the wavelength. The added resistance at the investigated Froude number of 0.05 shows higher uncertainty levels, this applies to the results of both the numerical methods and model tests.

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来源期刊
自引率
12.00%
发文量
2374
审稿时长
4.6 months
期刊介绍: Journal of Hydrodynamics is devoted to the publication of original theoretical, computational and experimental contributions to the all aspects of hydrodynamics. It covers advances in the naval architecture and ocean engineering, marine and ocean engineering, environmental engineering, water conservancy and hydropower engineering, energy exploration, chemical engineering, biological and biomedical engineering etc.
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