“ML”的版本间的差异
来自个人维基
小 (→Gradient Descent) |
小 (→Week3 - Logistic Regression) |
||
| 第69行: | 第69行: | ||
<math>θ = (X^TX)^{-1}X^Ty</math> | <math>θ = (X^TX)^{-1}X^Ty</math> | ||
| − | =Week3 - Logistic Regression= | + | =Week3 - Logistic Regression & Overfitting= |
| − | ==Sigmoid Function - S函数== | + | ==Logistic Regression== |
| + | ===Sigmoid Function - S函数=== | ||
<math>h_θ(x)=g(θ^Tx)</math> | <math>h_θ(x)=g(θ^Tx)</math> | ||
<math>z = θ^Tx</math> | <math>z = θ^Tx</math> | ||
<math>g(z) = \frac{1}{1+e^{-z}}</math> | <math>g(z) = \frac{1}{1+e^{-z}}</math> | ||
| − | ==Cost Function== | + | ===Cost Function=== |
<math>J(θ)=-\frac{1}{m}\sum_{i=1}^m[y^{(i)}*logh_θ(x^{(i)})+(1-y^{(i)})*log(1-h_θ(x^{(i)}))]</math> | <math>J(θ)=-\frac{1}{m}\sum_{i=1}^m[y^{(i)}*logh_θ(x^{(i)})+(1-y^{(i)})*log(1-h_θ(x^{(i)}))]</math> | ||
向量化形式: | 向量化形式: | ||
| 第82行: | 第83行: | ||
</math> | </math> | ||
| − | ==Gradient Descent== | + | ===Gradient Descent=== |
<math>θ_j:=θ_j-α\frac{∂}{∂θ_j}J(θ)</math> | <math>θ_j:=θ_j-α\frac{∂}{∂θ_j}J(θ)</math> | ||
:<math>= θ_j-\frac{α}{m}\sum_{i=1}^m( (h_θ(x^{(i)})-y^{(i)}) x_j^{(i)} ) </math> | :<math>= θ_j-\frac{α}{m}\sum_{i=1}^m( (h_θ(x^{(i)})-y^{(i)}) x_j^{(i)} ) </math> | ||
2018年12月21日 (五) 22:41的版本
目录[隐藏] |
定义
- 约定:
- x(i)j:训练数据中的第i列中的第j个特征值 value of feature j in the ith training example
- x(i):训练数据中第i列 the input (features) of the ith training example
- m:训练数据集条数 the number of training examples
- n:特征数量 the number of features
Week1
Cost Function损失函数
Squared error function/Mean squared function均方误差:
Cross entropy交叉熵:
Gradient Descent梯度下降
对于线性回归模型,其损失函数为均方误差,故有:
对于j>=1:
Week2
Multivariate Linear Regression
其中,
- m为训练数据组数,n为特征个数(通常,为了方便处理,会令。
Feature Scaling & Standard Normalization
其中,是第i个特征数据x_i的均值,而 则要视情况而定:
- Feature Scaling:为中最大值与最小值的差(max-min);
- Standard Normalization:为中数据标准差(standard deviation)。
特别注意,通过 Feature scaling训练出模型后,在进行预测时,同样需要对输入特征数据进行归一化。
Normal Equation标准工程
Week3 - Logistic Regression & Overfitting
Logistic Regression
Sigmoid Function - S函数
Cost Function
向量化形式:
Gradient Descent
向量化形式:
解决Overfitting
针对 hypothesis function,引入 Regularation parameter()到 Cost function中:
