脚本专栏 
首页 > 脚本专栏 > 浏览文章

使用PyTorch实现MNIST手写体识别代码

(编辑:jimmy 日期: 2024/11/19 浏览:3 次 )

实验环境

win10 + anaconda + jupyter notebook

Pytorch1.1.0

Python3.7

gpu环境(可选)

MNIST数据集介绍

MNIST 包括6万张28x28的训练样本,1万张测试样本,可以说是CV里的“Hello Word”。本文使用的CNN网络将MNIST数据的识别率提高到了99%。下面我们就开始进行实战。

导入包

import torch
import torch.nn as nn
import torch.nn.functional as F
import torch.optim as optim
from torchvision import datasets, transforms
torch.__version__

定义超参数

BATCH_SIZE=512
EPOCHS=20 
DEVICE = torch.device("cuda" if torch.cuda.is_available() else "cpu") 

数据集

我们直接使用PyTorch中自带的dataset,并使用DataLoader对训练数据和测试数据分别进行读取。如果下载过数据集这里download可选择False

train_loader = torch.utils.data.DataLoader(
    datasets.MNIST('data', train=True, download=True, 
            transform=transforms.Compose([
              transforms.ToTensor(),
              transforms.Normalize((0.1307,), (0.3081,))
            ])),
    batch_size=BATCH_SIZE, shuffle=True)

test_loader = torch.utils.data.DataLoader(
    datasets.MNIST('data', train=False, transform=transforms.Compose([
              transforms.ToTensor(),
              transforms.Normalize((0.1307,), (0.3081,))
            ])),
    batch_size=BATCH_SIZE, shuffle=True)

定义网络

该网络包括两个卷积层和两个线性层,最后输出10个维度,即代表0-9十个数字。

class ConvNet(nn.Module):
  def __init__(self):
    super().__init__()
    self.conv1=nn.Conv2d(1,10,5) # input:(1,28,28) output:(10,24,24) 
    self.conv2=nn.Conv2d(10,20,3) # input:(10,12,12) output:(20,10,10)
    self.fc1 = nn.Linear(20*10*10,500)
    self.fc2 = nn.Linear(500,10)
  def forward(self,x):
    in_size = x.size(0)
    out = self.conv1(x)
    out = F.relu(out)
    out = F.max_pool2d(out, 2, 2) 
    out = self.conv2(out)
    out = F.relu(out)
    out = out.view(in_size,-1)
    out = self.fc1(out)
    out = F.relu(out)
    out = self.fc2(out)
    out = F.log_softmax(out,dim=1)
    return out

实例化网络

model = ConvNet().to(DEVICE) # 将网络移动到gpu上
optimizer = optim.Adam(model.parameters()) # 使用Adam优化器

定义训练函数

def train(model, device, train_loader, optimizer, epoch):
  model.train()
  for batch_idx, (data, target) in enumerate(train_loader):
    data, target = data.to(device), target.to(device)
    optimizer.zero_grad()
    output = model(data)
    loss = F.nll_loss(output, target)
    loss.backward()
    optimizer.step()
    if(batch_idx+1)%30 == 0: 
      print('Train Epoch: {} [{}/{} ({:.0f}%)]\tLoss: {:.6f}'.format(
        epoch, batch_idx * len(data), len(train_loader.dataset),
        100. * batch_idx / len(train_loader), loss.item()))

定义测试函数

def test(model, device, test_loader):
  model.eval()
  test_loss = 0
  correct = 0
  with torch.no_grad():
    for data, target in test_loader:
      data, target = data.to(device), target.to(device)
      output = model(data)
      test_loss += F.nll_loss(output, target, reduction='sum').item() # 将一批的损失相加
      pred = output.max(1, keepdim=True)[1] # 找到概率最大的下标
      correct += pred.eq(target.view_as(pred)).sum().item()

  test_loss /= len(test_loader.dataset)
  print('\nTest set: Average loss: {:.4f}, Accuracy: {}/{} ({:.0f}%)\n'.format(
    test_loss, correct, len(test_loader.dataset),
    100. * correct / len(test_loader.dataset)))

开始训练

for epoch in range(1, EPOCHS + 1):
  train(model, DEVICE, train_loader, optimizer, epoch)
  test(model, DEVICE, test_loader)

实验结果

Train Epoch: 1 [14848/60000 (25%)]	Loss: 0.375058
Train Epoch: 1 [30208/60000 (50%)]	Loss: 0.255248
Train Epoch: 1 [45568/60000 (75%)]	Loss: 0.128060

Test set: Average loss: 0.0992, Accuracy: 9690/10000 (97%)

Train Epoch: 2 [14848/60000 (25%)]	Loss: 0.093066
Train Epoch: 2 [30208/60000 (50%)]	Loss: 0.087888
Train Epoch: 2 [45568/60000 (75%)]	Loss: 0.068078

Test set: Average loss: 0.0599, Accuracy: 9816/10000 (98%)

Train Epoch: 3 [14848/60000 (25%)]	Loss: 0.043926
Train Epoch: 3 [30208/60000 (50%)]	Loss: 0.037321
Train Epoch: 3 [45568/60000 (75%)]	Loss: 0.068404

Test set: Average loss: 0.0416, Accuracy: 9859/10000 (99%)

Train Epoch: 4 [14848/60000 (25%)]	Loss: 0.031654
Train Epoch: 4 [30208/60000 (50%)]	Loss: 0.041341
Train Epoch: 4 [45568/60000 (75%)]	Loss: 0.036493

Test set: Average loss: 0.0361, Accuracy: 9873/10000 (99%)

Train Epoch: 5 [14848/60000 (25%)]	Loss: 0.027688
Train Epoch: 5 [30208/60000 (50%)]	Loss: 0.019488
Train Epoch: 5 [45568/60000 (75%)]	Loss: 0.018023

Test set: Average loss: 0.0344, Accuracy: 9875/10000 (99%)

Train Epoch: 6 [14848/60000 (25%)]	Loss: 0.024212
Train Epoch: 6 [30208/60000 (50%)]	Loss: 0.018689
Train Epoch: 6 [45568/60000 (75%)]	Loss: 0.040412

Test set: Average loss: 0.0350, Accuracy: 9879/10000 (99%)

Train Epoch: 7 [14848/60000 (25%)]	Loss: 0.030426
Train Epoch: 7 [30208/60000 (50%)]	Loss: 0.026939
Train Epoch: 7 [45568/60000 (75%)]	Loss: 0.010722

Test set: Average loss: 0.0287, Accuracy: 9892/10000 (99%)

Train Epoch: 8 [14848/60000 (25%)]	Loss: 0.021109
Train Epoch: 8 [30208/60000 (50%)]	Loss: 0.034845
Train Epoch: 8 [45568/60000 (75%)]	Loss: 0.011223

Test set: Average loss: 0.0299, Accuracy: 9904/10000 (99%)

Train Epoch: 9 [14848/60000 (25%)]	Loss: 0.011391
Train Epoch: 9 [30208/60000 (50%)]	Loss: 0.008091
Train Epoch: 9 [45568/60000 (75%)]	Loss: 0.039870

Test set: Average loss: 0.0341, Accuracy: 9890/10000 (99%)

Train Epoch: 10 [14848/60000 (25%)]	Loss: 0.026813
Train Epoch: 10 [30208/60000 (50%)]	Loss: 0.011159
Train Epoch: 10 [45568/60000 (75%)]	Loss: 0.024884

Test set: Average loss: 0.0286, Accuracy: 9901/10000 (99%)

Train Epoch: 11 [14848/60000 (25%)]	Loss: 0.006420
Train Epoch: 11 [30208/60000 (50%)]	Loss: 0.003641
Train Epoch: 11 [45568/60000 (75%)]	Loss: 0.003402

Test set: Average loss: 0.0377, Accuracy: 9894/10000 (99%)

Train Epoch: 12 [14848/60000 (25%)]	Loss: 0.006866
Train Epoch: 12 [30208/60000 (50%)]	Loss: 0.012617
Train Epoch: 12 [45568/60000 (75%)]	Loss: 0.008548

Test set: Average loss: 0.0311, Accuracy: 9908/10000 (99%)

Train Epoch: 13 [14848/60000 (25%)]	Loss: 0.010539
Train Epoch: 13 [30208/60000 (50%)]	Loss: 0.002952
Train Epoch: 13 [45568/60000 (75%)]	Loss: 0.002313

Test set: Average loss: 0.0293, Accuracy: 9905/10000 (99%)

Train Epoch: 14 [14848/60000 (25%)]	Loss: 0.002100
Train Epoch: 14 [30208/60000 (50%)]	Loss: 0.000779
Train Epoch: 14 [45568/60000 (75%)]	Loss: 0.005952

Test set: Average loss: 0.0335, Accuracy: 9897/10000 (99%)

Train Epoch: 15 [14848/60000 (25%)]	Loss: 0.006053
Train Epoch: 15 [30208/60000 (50%)]	Loss: 0.002559
Train Epoch: 15 [45568/60000 (75%)]	Loss: 0.002555

Test set: Average loss: 0.0357, Accuracy: 9894/10000 (99%)

Train Epoch: 16 [14848/60000 (25%)]	Loss: 0.000895
Train Epoch: 16 [30208/60000 (50%)]	Loss: 0.004923
Train Epoch: 16 [45568/60000 (75%)]	Loss: 0.002339

Test set: Average loss: 0.0400, Accuracy: 9893/10000 (99%)

Train Epoch: 17 [14848/60000 (25%)]	Loss: 0.004136
Train Epoch: 17 [30208/60000 (50%)]	Loss: 0.000927
Train Epoch: 17 [45568/60000 (75%)]	Loss: 0.002084

Test set: Average loss: 0.0353, Accuracy: 9895/10000 (99%)

Train Epoch: 18 [14848/60000 (25%)]	Loss: 0.004508
Train Epoch: 18 [30208/60000 (50%)]	Loss: 0.001272
Train Epoch: 18 [45568/60000 (75%)]	Loss: 0.000543

Test set: Average loss: 0.0380, Accuracy: 9894/10000 (99%)

Train Epoch: 19 [14848/60000 (25%)]	Loss: 0.001699
Train Epoch: 19 [30208/60000 (50%)]	Loss: 0.000661
Train Epoch: 19 [45568/60000 (75%)]	Loss: 0.000275

Test set: Average loss: 0.0339, Accuracy: 9905/10000 (99%)

Train Epoch: 20 [14848/60000 (25%)]	Loss: 0.000441
Train Epoch: 20 [30208/60000 (50%)]	Loss: 0.000695
Train Epoch: 20 [45568/60000 (75%)]	Loss: 0.000467

Test set: Average loss: 0.0396, Accuracy: 9894/10000 (99%)

总结

一个实际项目的工作流程:找到数据集,对数据做预处理,定义我们的模型,调整超参数,测试训练,再通过训练结果对超参数进行调整或者对模型进行调整。

以上这篇使用PyTorch实现MNIST手写体识别代码就是小编分享给大家的全部内容了,希望能给大家一个参考,也希望大家多多支持。

上一篇:python实现加密的方式总结
下一篇:TensorFlow tensor的拼接实例
一句话新闻
一文看懂荣耀MagicBook Pro 16
荣耀猎人回归!七大亮点看懂不只是轻薄本,更是游戏本的MagicBook Pro 16.
人们对于笔记本电脑有一个固有印象:要么轻薄但性能一般,要么性能强劲但笨重臃肿。然而,今年荣耀新推出的MagicBook Pro 16刷新了人们的认知——发布会上,荣耀宣布猎人游戏本正式回归,称其继承了荣耀 HUNTER 基因,并自信地为其打出“轻薄本,更是游戏本”的口号。
众所周知,寻求轻薄本的用户普遍更看重便携性、外观造型、静谧性和打字办公等用机体验,而寻求游戏本的用户则普遍更看重硬件配置、性能释放等硬核指标。把两个看似难以相干的产品融合到一起,我们不禁对它产生了强烈的好奇:作为代表荣耀猎人游戏本的跨界新物种,它究竟做了哪些平衡以兼顾不同人群的各类需求呢?
友情链接:杰晶网络 DDR爱好者之家 南强小屋 黑松山资源网 白云城资源网 SiteMap