Title: A mathematical solve on the three-interfering-resonances' parameters Show Chinese title

Title: 三个干扰共振参数的数学求解

Abstract: The multiple-solution problem in determining the three-interfering-resonances' parameters from a fit to an experimentally measured distribution is considered in a mathematical viewpoint. In this paper it is shown that there are four numerical solutions for the fit with three coherent Breit-Wigner functions. Although the explicit analytical formulae can not be derived in this case, we provide some constraint equations between the four solutions. For the cases of nonrelativistic and relativistic Breit-Wigner forms of amplitude functions, numerical method is provided to derive the other solutions from the already obtained one based on the obtained constraint equations. In real experimental measurements with more complicated amplitude forms similar to Breit-Wigner functions, the same method can be deduced and performed to get numerical solutions. The well agreement between the solved solutions using this mathematical method and those from the fit directly verifies the correctness of the supplied constraint equations and mathematical methodology. Show Chinese abstract

Abstract: 从数学角度考虑了通过拟合实验测量分布来确定三个干扰共振参数时的多解问题。 在本文中表明，使用三个相干Breit-Wigner函数进行拟合时存在四个数值解。 尽管在这种情况下无法推导出显式的解析公式，但我们提供了四个解之间的约束方程。 对于非相对论和相对论形式的振幅函数的Breit-Wigner形式，提供了数值方法，基于已获得的约束方程，可以从已获得的一个解中推导出其他解。 在具有更复杂振幅形式的实际实验测量中，类似于Breit-Wigner函数的形式，可以推导并执行相同的方法以获得数值解。 使用这种数学方法求解的解与直接拟合得到的解之间的一致性验证了所提供约束方程和数学方法的正确性。