udf自定义空化计算问题
用udf编写的sauer空化模型按道理来讲计算结果应该和fluent自带的sauer模型一致
但是计算的收敛性很不好,而且结果也不理想
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
下图是用fluent自带sauer计算的结果
data:image/png;base64,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
#include "udf.h"
#include "mem.h"
#define MIN_VOF 1.e-5
#define MAX_VOF 0.999999
DEFINE_MASS_TRANSFER(liq_gas_src, c, t, from_index, from_species_index, to_index, to_species_index)
{
real p_vapor;
real n_bubbles;
real dp, Tvap, Tliq, rhoL, rhoV, rho_mix, xs_zhong, rad_dot, m_dot, vofM, RB;
Thread *gas, *liq;
liq=THREAD_SUB_THREAD(t, from_index);
gas=THREAD_SUB_THREAD(t, to_index);
m_dot=0.0;
n_bubbles=pow(10., 8.);
vofM=MIN(MAX(MIN_VOF, C_VOF(c, gas)), MAX_VOF); /*气相体积分数通过该算法控制在0与1之间,增加收敛性*/
RB=pow((3*vofM/(1-vofM)/4/M_PI/n_bubbles), 1./3.);
if(C_T(c, gas)>=66.&&C_T(c, gas)<=99.) /*给定一个判断,使得带入后续的温度T在正常范围内,增加收敛性*/
Tvap=C_T(c, gas);
else
Tvap=83.06;
if(C_T(c, liq)>=66.&&C_T(c, liq)<=99.) /*给定一个判断,使得带入后续的温度T在正常范围内,增加收敛性*/
Tliq=C_T(c, liq);
else
Tliq=83.06;
p_vapor=-2.714*pow(10., 6.)+1.275*pow(10., 5.)*Tliq-2037.*pow(Tliq, 2.)+11.12*pow(Tliq, 3.); /*饱和蒸气压---随液相温度变化的曲线*/
dp=p_vapor-C_P(c, liq);
rhoL=1200.-7.743*Tliq+0.06109*pow(Tliq, 2.)-0.0003474*pow(Tliq, 3.); /*液相密度---随温度变化的函数*/
rhoV=-126.2+5.696*Tvap-0.08805*pow(Tvap, 2.)+0.0004689*pow(Tvap, 3.); /*气相密度---随温度变化的函数*/
rho_mix=vofM*rhoV+(1-vofM)*rhoL;
xs_zhong=(3*vofM*(1-vofM)/RB)*rhoL*rhoV/rho_mix;
rad_dot=pow(2.*ABS(dp)/3./rhoL, 1./2.);
if(dp>0.)
m_dot=xs_zhong*rad_dot;
else
{
m_dot=-xs_zhong*rad_dot;
if(C_VOF(c, gas)<=MIN_VOF) m_dot=0.;
}
return(m_dot);
}
我在论文里看到用户自定义的空化,临界压力会放大1.15,所以你要不要尝试把临界压力除一下试试 luyu 发表于 2023-4-10 15:54
我在论文里看到用户自定义的空化,临界压力会放大1.15,所以你要不要尝试把临界压力除一下试试
好像还是不对:'(,但还是谢谢你的回答
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