In this chapter, we will be focusing on basic example of linear regression implementation using TensorFlow. Logistic regression or linear regression is a supervised machine learning approach for the classification of order discrete categories. Our goal in this chapter is to build a model by which a user can predict the relationship between predictor variables and one or more independent variables.
The relationship between these two variables is considered linear i.e., if y is the dependent variable and x is considered as the independent variable, then the linear regression relationship of two variables will look like the equation which is mentioned as below −
Y = Ax+b
Next, we shall design an algorithm for linear regression which allows us to understand two important concepts given below −
The schematic representation of linear regression is mentioned below
$$Y=ax+b$$
The value of a is the slope.
The value of b is the y − intercept.
r is the correlation coefficient.
r2 is the correlation coefficient.
The graphical view of the equation of linear regression is mentioned below −
Following steps are used for implementing linear regression using PyTorch −
Import the necessary packages for creating a linear regression in PyTorch using the below code −
import numpy as np import matplotlib.pyplot as plt from matplotlib.animation import FuncAnimation import seaborn as sns import pandas as pd %matplotlib inline sns.set_style(style = 'whitegrid') plt.rcParams["patch.force_edgecolor"] = True
Create a single training set with the available data set as shown below −
m = 2 # slope c = 3 # interceptm = 2 # slope c = 3 # intercept x = np.random.rand(256) noise = np.random.randn(256) / 4 y = x * m + c + noise df = pd.DataFrame() df['x'] = x df['y'] = y sns.lmplot(x ='x', y ='y', data = df)
Implement linear regression with PyTorch libraries as mentioned below −
import torch import torch.nn as nn from torch.autograd import Variable x_train = x.reshape(-1, 1).astype('float32') y_train = y.reshape(-1, 1).astype('float32') class LinearRegressionModel(nn.Module): def __init__(self, input_dim, output_dim): super(LinearRegressionModel, self).__init__() self.linear = nn.Linear(input_dim, output_dim) def forward(self, x): out = self.linear(x) return out input_dim = x_train.shape[1] output_dim = y_train.shape[1] input_dim, output_dim(1, 1) model = LinearRegressionModel(input_dim, output_dim) criterion = nn.MSELoss() [w, b] = model.parameters() def get_param_values(): return w.data[0][0], b.data[0] def plot_current_fit(title = ""): plt.figure(figsize = (12,4)) plt.title(title) plt.scatter(x, y, s = 8) w1 = w.data[0][0] b1 = b.data[0] x1 = np.array([0., 1.]) y1 = x1 * w1 + b1 plt.plot(x1, y1, 'r', label = 'Current Fit ({:.3f}, {:.3f})'.format(w1, b1)) plt.xlabel('x (input)') plt.ylabel('y (target)') plt.legend() plt.show() plot_current_fit('Before training')
The plot generated is as follows −