《统计学习方法》第7章_支持向量机

import numpy as np
import pandas as pd

from sklearn.datasets import load_iris
from sklearn.model_selection import train_test_split

import matplotlib.pyplot as plt


# 数据集
def create_data():
    iris = load_iris()
    df = pd.DataFrame(iris.data, columns=iris.feature_names)
    df["label"] = iris.target
    df.columns = ['sepal length', 'sepal width', 'petal length', 'petal width', 'label']
    data = np.array(df.iloc[:100, [0, 1, -1]])
    for i in range(len(data)):
        if data[i, -1] == 0:
            data[i, -1] = -1
    return data[:, :2], data[:, -1]

X, y = create_data()
X_train, X_test, y_train, y_test = train_test_split(X, y, train_size=0.25)

# plt.scatter(X[:50, 0], X[:50, 1], label='0')
# plt.scatter(X[50:, 0], X[50:, 1], label="1")
# plt.legend()
# plt.show()

class SVM:
    def __init__(self, max_iter=100, kernel="linear"):
        self.max_iter = max_iter
        self._kernel = kernel

    def init_args(self, features, labels):
        self.m, self.n = features.shape
        self.X = features
        self.Y = labels
        self.b = 0.0

        # 将Ei保存在一个列表里
        self.alpha = np.ones(self.m)
        self.E = [self._E(i) for i in range(self.m)]
        # 松弛变量
        self.C = 1.0

    # 核函数
    # 参考《统计学习方法》P122 公式(7.88)
    def kernel(self, x1, x2):
        if self._kernel == "linear":  # 线性核函数
            return sum([x1[k] * x2[k] for k in range(self.n)])
        elif self._kernel == "poly":  # 多项式核函数
            return (sum([x1[k] * x2[k] for k in range(self.n)]) + 1) ** 2

        return 0

    # g(x)为预测，输入xi(X[i])
    # 参考《统计学习方法》P127 公式(7.105)
    def _g(self, i):
        r = self.b
        for j in range(self.m):
            r += self.alpha[j] * self.Y[j] * self.kernel(self.X[i], self.X[j])
        return r

    # KKT条件
    # 参考《统计学习方法》P113
    def _KKT(self, i):
        y_g = self._g(i) * self.Y[i]
        if self.alpha[i] == 0:
            return y_g >= 1
        elif 0 < self.alpha[i] < self.C:
            return y_g == 1
        else:
            return y_g <= 1

    # E(x)为g(x)对输入x的预测值和真实输出y的差
    # 参考《统计学习方法》P127 公式(7.105)
    def _E(self, i):
        return self._g(i) - self.Y[i]

    def _init_alpha(self):
        # 外层循环首先遍历所有满足0= 0:
                j = min(range(self.m), key=lambda x:self.E[x])
            else:
                j = max(range(self.m), key=lambda x:self.E[x])
            return i, j

    # 参考《统计学习方法》P127 公式(7.108)
    def _compare(self, _alpha, L, H):
        if _alpha > H:
            return H
        elif _alpha < L:
            return L
        else:
            return _alpha

    def fit(self, features, labels):
        self.init_args(features, labels)

        for t in range(self.max_iter):
            # 训练
            i1, i2 =self._init_alpha()

            # 边界--参考《统计学习方法》P126 下面
            if self.Y[i1] == self.Y[i2]:
                L = max(0, self.alpha[i1] + self.alpha[i2] - self.C)
                H = min(self.C, self.alpha[i1] + self.alpha[i2])
            else:
                L = max(0, self.alpha[i2] - self.alpha[i1])
                H = min(self.C, self.C + self.alpha[i2] - self.alpha[i1])

            E1 = self.E[i1]
            E2 = self.E[i2]
            # eta=K11+K22-2K12
            # 参考《统计学习方法》P127 公式(7.107)
            eta = self.kernel(self.X[i1], self.X[i1]) + self.kernel(self.X[i2], self.X[i2]) - 2 * self.kernel(X[i1], X[i2])
            if eta <= 0:
                continue
            # 此处有修改，根据书上应该是E1 - E2，书上130-131页
            # 参考《统计学习方法》P127 公式(7.106)
            alpha2_new_unc = self.alpha[i2] + self.Y[i2] * (E1 - E2) / eta
            # 参考《统计学习方法》P127 公式(7.108)
            alpha2_new = self._compare(alpha2_new_unc, L, H)
            # 参考《统计学习方法》P127 公式(7.109)
            alpha1_new = self.alpha[i1] + self.Y[i1] * self.Y[i2] * (self.alpha[i2] - alpha2_new)

            # 参考《统计学习方法》P130 公式(7.115)
            b1_new = - E1 - self.Y[i1] * self.kernel(self.X[i1], self.X[i1]) * (
                    alpha1_new - self.alpha[i1]) - self.Y[i2] * self.kernel(self.X[i2], self.X[i1]) * (
                alpha2_new - self.alpha[i2]) + self.b
            # 参考《统计学习方法》P130 公式(7.116)
            b2_new = - E2 - self.Y[i1] * self.kernel(self.X[i1], self.X[i2]) * (
                    alpha1_new - self.alpha[i1]) - self.Y[i2] * self.kernel(self.X[i2], self.X[i2]) * (
                alpha2_new - self.alpha[i2]) + self.b

            # 参考《统计学习方法》P130 中间部分
            if 0 < alpha1_new < self.C:
                b_new = b1_new
            elif 0 < alpha2_new < self.C:
                b_new = b2_new
            else:
                # 选择中点
                b_new = (b1_new + b2_new) / 2

            # 更新参数
            self.alpha[i1] = alpha1_new
            self.alpha[i2] = alpha2_new
            self.b = b_new

            self.E[i1] = self._E(i1)
            self.E[i2] = self._E(i2)
        return "train done!"

    def predict(self, data):
        r = self.b
        for i in range(self.m):
            r += self.alpha[i] * self.Y[i] * self.kernel(data, self.X[i])

        return 1 if r > 0 else -1

    def score(self, X_test, y_test):
        right_count = 0
        for i in range(len(X_test)):
            result = self.predict(X_test[i])
            if result == y_test[i]:
                right_count += 1
        return right_count / len(X_test)

    def _weight(self):
        # linear model
        yx = self.Y.reshape(-1, 1) * self.X
        self.w = np.dot(yx.T, self.alpha)
        return self.w


svm = SVM(max_iter=200)
svm.fit(X_train, y_train)
print(svm.score(X_test, y_test))