The paper analyzed the characteristics of smoothing and B spline function,it is put forward the error distribution fitted according to the existent survey data by using smoothing function,the calculation formula is deduced,and its rationality is validated with the survey data.

So we reformulate the generalized nonlinear complementarity problem over a polyhedral cone as a system of smoothing equations and a smooth unconstrained optimization problem by using a smoothing function,and present the relation of the stationary point of the merit function and the solution of the generalized nonlinear.

The first step is to convert equivalently the discrete problem into continuous problem taking advantages of the step-up function; The second step is to define the polish function to approach the step-up function; The third step is to establish the mapping model by introducing the filter function which is the inverse functio.

In this paper,a regularization method is employed for a class of ill-posed inverse boundary problems of Laplace equation by introducing mollification kernel function ρδ(t)=1δπexp(-t2δ2).