这里展示利用python实现的最小二乘的直接求解方法。其求解原理,请参考:最小二乘法拟合非线性函数及其Matlab/Excel 实现
1.一般曲线拟合
代码如下:
# -*- coding:utf-8 -*- ''' Created on Feb 20, 2017 最小二乘拟合 给定的函数 fit_fun(x) 已知数据X(2xN),Y(1xN),可直接计算直线的参数a和b 直接计算的公式:ab = inv(XXt)*X*Yt @author: Xiankai Chen @email: xiankai.chen@qq.com ''' import numpy as np import matplotlib.pyplot as plt def fun2ploy(x,n): ''' 数据转化为[x^0,x^1,x^2,...x^n] ''' lens = len(x) X = np.ones([1,lens]); for i in range(1,n): X = np.vstack((X,np.power(x,i))) return X def leastseq_byploy(x,y,ploy_dim): ''' 最小二乘求解 ''' #散点图 plt.scatter(x,y,color="r",marker='o',s = 50) X = fun2ploy(x,ploy_dim); #直接求解 Xt = X.transpose(); XXt=X.dot(Xt); XXtInv = np.linalg.inv(XXt) XXtInvX = XXtInv.dot(X) coef = XXtInvX.dot(y.T) y_est = Xt.dot(coef) return y_est,coef def fit_fun(x): ''' 要拟合的函数 ''' #return np.power(x,5) return np.sin(x) #return 5*x+3 if __name__ == '__main__': data_num = 100; ploy_dim =10; noise_scale = 0.2; ## 数据准备 x = np.array(np.linspace(-2*np.pi,2*np.pi,data_num)) y = fit_fun(x)+noise_scale*np.random.rand(1,data_num) # 最小二乘拟合 [y_est,coef] = leastseq_byploy(x,y,10) #显示拟合结果 org_data = plt.scatter(x,y,color="r",marker='o',s = 50) est_data = plt.plot(x,y_est,color="b",linewidth= 3) plt.xlabel("X") plt.ylabel("Y") plt.title("Fit funtion with leastseq method") plt.legend(["Noise data","Fited function"]); plt.show()
结果图示
当维度增加求解矩阵的你运算会消耗较大的计算资源,通常采用梯度下降法,牛顿法等数值迭代算法进行求解。
参考资料: