共查询到18条相似文献,搜索用时 171 毫秒
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水下航行体通气超空泡减阻特性实验研究 总被引:7,自引:1,他引:6
为了研究超空泡的减阻效果,保证在较低流速下生成超空泡,在水洞中开展了水下航行体通气超空泡的实验研究.采用通气的方法在较低水速下生成人工通气超空泡,通过改变通气率和弗劳德数,获得了不同条件下通气空泡的长度,以及不同空泡长度下的模型阻力系数.研究表明,来流速度不变时,空泡长度随通气率的增加而增加,阻力系数随空泡长度的增加先递增后递减;空化器直径对阻力系数的影响较大,在大弗劳德数条件下,阻力系数会因空化器直径过大而出现随通气量的增加而变大的趋势.利用商用软件对超空泡形态及阻力系数作了数值仿真,并与实验结果作了对比,两者符合较好. 相似文献
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水下高速射弹超空泡形态特性的数值模拟研究 总被引:1,自引:0,他引:1
基于均匀多相流假设,建立了水下射弹自然超空化流动的多相流CFD模型,分析了带圆锥和圆盘空化器头部2种高速射弹模型所产生的超空泡形态特性.仿真结果表明,圆盘头形空化器有利于射弹超空泡的形成;超空泡的相对直径与相对长度随空化数增加而减小;空化数越小,超空泡的长细比越大,减阻效果也越好.最后,通过Fluent软件的自定义函数模拟了带圆盘空化器头部射弹超空泡流发展过程,得到了射弹在水下高速航行过程中超空泡形态的变化特性,研究结果为进一步研究水下高速射弹空泡流水动力特性提供了理论参考. 相似文献
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为了建立通气超空化流动计算的流动模型,应用二次开发技术将FBM湍流模型嵌入商业软件,分别采用FBM湍流模型以及商业软件中的标准k-ε湍流模型模拟了绕圆盘空化器的通气空化流场,并从空泡形态、流动结构和阻力特性等方面与试验结果进行了对比。结果表明,标准k-ε湍流模型过高预测了流场的湍流粘性,预测的空泡形态和实验观测结果有较大的差距;采用滤波器湍流模型计算,可以明显地减小通气空泡尾端流场的湍流黏性,精确地捕捉通气空化区域空泡脱落的非定常细节,更加准确地描述通气空化的过程,与试验结果更加接近。 相似文献
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空化器倾斜角对超空泡流影响的三维数值仿真研究 总被引:1,自引:0,他引:1
为了研究空化器倾斜角发生变化时流体动力变化规律及其对超空泡航行体控制有效性的影响,对圆盘和圆锥空化器在具有不同倾斜角时进行了数值仿真,仿真结果表明:空化器锥角不同时生成的超空泡形态和空化器的流体动力特性都有很大的不同;不同超空泡航行体对于空化器的选择应该根据航行体自身特点进行选择;将圆盘和圆锥空化器进行组合可以改变单一种类空化器的外形和流体动力特性,增加对空化器选择的灵活性. 相似文献
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水下航行体通气超空泡的实验研究 总被引:1,自引:1,他引:0
为了研究超空泡的减阻效果,保证在较低流速下生成超空泡,在水洞中开展了水下航行体通气超空泡的实验研究.采用通气的方法在较低水速下(V=7-15 m/s)生成人工通气超空泡,通过改变通气率和弗洛德数,获得了不同条件下通气空泡的长度,给出了通气空泡长度与通气率及弗洛德数的经验公式.研究表明,来流速度不变时,空泡长度随通气率的增加而增加,空泡长度一定时,通气率随弗洛德数的增加而减少;重力场造成了空泡形态的严重不对称,通过比较相同空化数下自然空泡与通气空泡的长度,定量地给出了弗洛德数对通气空泡长度的影响.当Fr=43.74时,重力场对通气空泡长度的影响几乎可以忽略. 相似文献
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空化器设计及超空泡参数控制 总被引:10,自引:2,他引:8
简要介绍了超空泡武器技术中有关超空泡空化器设计、空泡形状及压缩性的影响,以及通过调节通气率或改变空化器阻力,来实现超空泡参数控制等问题的研究进展,并对今后的研究方向进行了展望。 相似文献
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通气空泡流中洞壁效应对空化数和压力场影响的研究 总被引:1,自引:0,他引:1
文章在均质平衡多相流模型的基础上耦合输运方程型空化模型,通过求解混合介质的RANS方程、RNGk-ε湍流输运方程以及各相的质量输运方程,采用通用CFD软件-FLUENT数值模拟了水洞中带圆盘空化器航行体模型的定常通气空泡流动,研究了圆形截面闭式空泡水洞中洞壁效应对通气空化数和压力场的影响.得到的阻塞空化数线性正比于圆盘水洞直径比,且与三维圆盘自然空泡流的势流近似解基本一致,分析了洞壁效应作用下空化流场内的压力分布特点,并根据计算结果拟合了一定适用条件下通气空泡长度、最大直径和模型阻力系数的近似公式. 相似文献
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攻角空化器的超空泡形态非对称特性研究 总被引:1,自引:0,他引:1
为了满足水下高速超空化航行体运动平衡性和稳定性要求,必须采用非对称超空泡流动模式,采用具有非零攻角的空化器是实现该要求的一种重要策略.基于冲量定理,理论分析了非零攻角空化器引起的超空泡轴向变形量随轴向长度的关系,获得了空化器攻角对超空泡非对称性及其影响因素之间的定性和定量关系,其一阶近似与同类文献的结论是一致的,数值模拟表明了所得结论的合理性和分析的正确性.研究表明,非零攻角空化器引起的超空泡轴线变形量与沿空泡长度的距离呈线性规律增加,并在空泡尾部达到最大,不可能单独利用空化器攻角沿空泡长度来中和重力影响. 相似文献
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文中研究了锥柱组合体模型在轴向约束加速运动中人工通气量对加速过程中超空泡形态的影响及其变化规律。研究表明模型在加速过程中不通气的情况下,只有锥柱结合面后尚有局部空泡,但未见超空泡形成。在通气量23.4g/s、19.0g/s、14.6g/s、9.3g/s下,均能在研究的σv范围内逐步形成超空泡。对于一定的通气量,随着模型运动速度的逐步提高,自然空化数逐步减小,空泡由短变长;由大片分段脱落不连续的空泡变成连续的空泡;由空泡长度明显的不稳定到稳定;由空泡表面不光滑到光滑;发展成空泡表面光滑透明的超空泡。超空泡随通气量的变化规律与水洞定常试验结果是一致的。 相似文献
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为分析来流速度对圆盘空化器产生超空泡的形态,基于粘流理论和有限体积方法,对带有圆盘空化器超空泡航行体流场进行了数值模拟。得到了超空泡形态与航行体速度之间的关系。随着速度的增加,空泡长度逐渐增大。并进一步给出了流场的压力分布云图和速度矢量图。 相似文献
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高速航行体的自然超空泡流阻力特性研究 总被引:1,自引:0,他引:1
利用Fluent6.2对水下带圆盘空化器高速航行体的自然超空泡流动进行了数值模拟,计算分析了超空泡高速航行体的阻力特性,研究了空化器直径、航行体长细比对航行体超空泡减阻效果的影响,分析了高速航行体的超空泡减阻率。结果表明,超空泡形态下随着航行体速度衰减,航行体压差阻力系数缓慢减小,粘性阻力系数迅速增大,航行体的总阻力系数增加;航行体阻力系数与头部空化器直径的平方成反比;增加航行体的长细比,可以获得更小的阻力系数;高速航行体的超空泡减阻率可达95%以上。最后将仿真计算结果与水靶道试验进行了对比,二者基本相符。 相似文献
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Water ramjets using outer water as an oxidizer have been demonstrated as a potential propulsion mode for underwater High Speed Supercavitating Vehicles (HSSVs) because of their higher energy density, power density, and specific impulse, but water flux changes the shapes of supercavity. To uncover the cavitator drag characteristics and the supercavity shape of HSSVs with water inflow for ramjets, supercavitation flows around a disk cavitator with inlet hole are studied using the homogenous model. By changing the water inflow in the range of 0–10 L/s through cavitators having different water inlet areas, a series of numerical simulations of supercavitation flows was performed. The water inflow flux of ramjets significantly influences the drag features of disk cavitators and the supercavity shape, but it has little influence on the slender ratio of supercavitaty. Furthermore, as the water inlet area increases, the drag coefficient of the cavitators’ front face decreases, but this increase does not influence the diameter of the supercavity’s maximum cross section and the drag coefficient of the entire cavitator significantly. In addition, with increasing water flux of the ramjet, both the drag coefficient of cavitators and the maximum diameter of supercavities decrease stably. This research will be helpful for layout optimization and supercavitaty scheme design of HSSVs with water inflow for ramjets. 相似文献
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To deal with the effect of compressible fluids on the supercavitating flow over the subsonic disk cavitator of a projectile, a finite volume method is formulated based on the ideal compressible potential theory. By using the continuity equation and Tait state equation as well as Riabouchinsky closure model, an “inverse problem” solution is presented for the supercavitating flow. According to the impenetrable condition on the surface of supercavity, a new iterative method for the supercavity shape is designed to deal with the effect of compressibility on the supercavity shape, pressure drag coefficient and density field. By this method, the very low cavitation number can be computed. The calculated results agree well with the experimental data and empirical formula. At the subsonic condition, the fluid compressibility will make supercavity length and radius increase. The supercavity expands, but remains spheroid. The effect on the first 1/3 part of supercavity is not obvious. The drag coefficient of projectile increases as the cavitation number or Mach number increases. With Mach number increasing, the compressibility is more and more significant. The compressibility must be considered as far as the accurate calculation of supercavitating flow is concerned. 相似文献
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《船舶与海洋工程学报》2015,(3)
To deal with the effect of compressible fluids on the supercavitating flow over the subsonic disk cavitator of a projectile, a finite volume method is formulated based on the ideal compressible potential theory. By using the continuity equation and Tait state equation as well as Riabouchinsky closure model, an "inverse problem" solution is presented for the supercavitating flow. According to the impenetrable condition on the surface of supercavity, a new iterative method for the supercavity shape is designed to deal with the effect of compressibility on the supercavity shape, pressure drag coefficient and density field. By this method, the very low cavitation number can be computed. The calculated results agree well with the experimental data and empirical formula. At the subsonic condition, the fluid compressibility will make supercavity length and radius increase. The supercavity expands, but remains spheroid. The effect on the first 1/3 part of supercavity is not obvious. The drag coefficient of projectile increases as the cavitation number or Mach number increases. With Mach number increasing, the compressibility is more and more significant. The compressibility must be considered as far as the accurate calculation of supercavitating flow is concerned. 相似文献