机械
振幅
流量(数学)
物理
曲面(拓扑)
共振(粒子物理)
简单(哲学)
跨度(工程)
自由面
常量(计算机编程)
经典力学
数学
光学
工程类
几何学
结构工程
计算机科学
原子物理学
哲学
认识论
程序设计语言
标识
DOI:10.5957/jsr.1962.6.1.8
摘要
The problem of pulsating supercavities under artificial ventilation is analytically treated as a resonance problem of a two-dimensional gas-liquid system using a linearized method. A simple kinematical consideration and a dynamical model of the flow lead to solutions for frequency and amplitude of pulsations. The criteria of pulsation are given in terms of a formula relating σv. and σ Maximum air-carrying capacities of pulsating cavities are also estimated. Most of the formulas involve an undetermined constant which must be estimated by using experimental data. The analytical results are compared with the experimental data obtained at the St. Anthony Falls Hydraulic Laboratory, and, in general, good agreement is obtained. It is found that pulsation is possible only for a two-dimensional cavity or a cavity in which a substantial portion of the span can be regarded as two-dimensional. The existence of a free surface is also essential to pulsation. The strong effect of the free surface suggests that pulsation may become an important problem in the open sea only when submergence is relatively small.
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