The mixed propagator (MP) approach to ρ-ω mixing is discussed. It is found that under the pole-approximation assumption the results of MP approach is not compatible both with the effective Lagrangian theory andwith ...The mixed propagator (MP) approach to ρ-ω mixing is discussed. It is found that under the pole-approximation assumption the results of MP approach is not compatible both with the effective Lagrangian theory andwith the experiment measurement criterion. To overcome these inconsistent, we propose a new MP approach in whichthe physical states of ρ and ω are determined by the requirement of experimental measurement to meson resonance. Interms of this new MP approach, the EM pion form factor Fπ and form factors of ρo →π0γ and of ω→πo γ are derived.The results of Fπ are in good agreement with data. The form factor of ρo →π0γ exhibits a hidden charge-asymmetryenhancement effect which agrees with the prediction of the effective Lagrangian theory.展开更多
近年来,作为重要的多目标决策手段的轮廓查询逐渐得到学术界的重视,相继提出了基于不同支配关系的多种轮廓变体查询.首先,通过对实际应用需求进行分析,提出了基于元组对应数值间比例值大小的ρ-支配关系的定义,进而提出了ρ-支配轮廓查...近年来,作为重要的多目标决策手段的轮廓查询逐渐得到学术界的重视,相继提出了基于不同支配关系的多种轮廓变体查询.首先,通过对实际应用需求进行分析,提出了基于元组对应数值间比例值大小的ρ-支配关系的定义,进而提出了ρ-支配轮廓查询的概念.其次,对ρ-支配轮廓的基本性质进行了细致而深入的分析,在此基础上,提出了基于分支定界的ρ-支配轮廓查询算法(Branch and Boundρ-Dominant Skyline Algorithm,BBDS),避免了对R-树索引的多次访问,从而提高了ρ-支配轮廓查询的执行效率.最后,通过大量的仿真实验对ρ-支配轮廓查询的语义进行分析,并对BBDS算法的性能进行验证.实验结果表明,ρ-支配轮廓查询是轮廓查询语义的扩展和补充,而提出的BBDS算法则是求解ρ-支配轮廓查询的高效算法.展开更多
文摘The mixed propagator (MP) approach to ρ-ω mixing is discussed. It is found that under the pole-approximation assumption the results of MP approach is not compatible both with the effective Lagrangian theory andwith the experiment measurement criterion. To overcome these inconsistent, we propose a new MP approach in whichthe physical states of ρ and ω are determined by the requirement of experimental measurement to meson resonance. Interms of this new MP approach, the EM pion form factor Fπ and form factors of ρo →π0γ and of ω→πo γ are derived.The results of Fπ are in good agreement with data. The form factor of ρo →π0γ exhibits a hidden charge-asymmetryenhancement effect which agrees with the prediction of the effective Lagrangian theory.
文摘近年来,作为重要的多目标决策手段的轮廓查询逐渐得到学术界的重视,相继提出了基于不同支配关系的多种轮廓变体查询.首先,通过对实际应用需求进行分析,提出了基于元组对应数值间比例值大小的ρ-支配关系的定义,进而提出了ρ-支配轮廓查询的概念.其次,对ρ-支配轮廓的基本性质进行了细致而深入的分析,在此基础上,提出了基于分支定界的ρ-支配轮廓查询算法(Branch and Boundρ-Dominant Skyline Algorithm,BBDS),避免了对R-树索引的多次访问,从而提高了ρ-支配轮廓查询的执行效率.最后,通过大量的仿真实验对ρ-支配轮廓查询的语义进行分析,并对BBDS算法的性能进行验证.实验结果表明,ρ-支配轮廓查询是轮廓查询语义的扩展和补充,而提出的BBDS算法则是求解ρ-支配轮廓查询的高效算法.