摘要
In [1],a new method is presented,which uses O. D. E. method(i. e. ordinary differential equations method)for finding the local optima of the general constrained optimization. However, the discussion about the constraints handled is continued by the ordinary differential equations in this paper. It is proved that the solutions starting from the neighbourhood of a critical point of the differential equations given in this paper about part variables always converge to the feasible point of Eq. (1. 1).
In [1],a new method is presented,which uses O. D. E. method(i. e. ordinary differential equations method)for finding the local optima of the general constrained optimization. However, the discussion about the constraints handled is continued by the ordinary differential equations in this paper. It is proved that the solutions starting from the neighbourhood of a critical point of the differential equations given in this paper about part variables always converge to the feasible point of Eq. (1. 1).