对一副图像进行傅立叶变换,从入门到放弃
一、在开始之前
知识点
本次教程涉及到的知识点:
傅里叶变换:
没搞明白。。
码云代码地址:https://gitee.com/steveqobs/opencv/chapter5
一、开始
引入
import cv2
import numpy as np
import random
import math
from matplotlib import pyplot as plt
设置窗口名称中文显示
plt.rcParams['font.sans-serif'] = ['SimHei'] # 用来正常显示中文标签
plt.rcParams['axes.unicode_minus'] = False # 用来正常显示负号
要用到的函数
def sp_noise(image, prob):
# 添加椒盐噪声
# prob:噪声比例
output = np.zeros(image.shape, np.uint8)
thres = 1 - prob
for i in range(image.shape[0]):
for j in range(image.shape[1]):
rdn = random.random()
if rdn < prob:
output[i][j] = 0
elif rdn > thres:
output[i][j] = 255
else:
output[i][j] = image[i][j]
return output
def gaussian_noise(image, mean=0, var=0.001):
# 添加高斯噪声
# mean : 均值
# var : 方差
image = np.array(image / 255, dtype=float)
noise = np.random.normal(mean, var ** 0.5, image.shape)
out = image + noise
if out.min() < 0:
low_clip = -1.
else:
low_clip = 0.
out = np.clip(out, low_clip, 1.0)
out = np.uint8(out * 255)
return out
def dft(self):
img = cv2.cvtColor(self, cv2.COLOR_BGR2GRAY)
dft = cv2.dft(np.float32(img), flags=cv2.DFT_COMPLEX_OUTPUT)
dft_shift = np.fft.fftshift(dft)
# 构建频谱图
magnitude_spectrum = 20 * np.log(cv2.magnitude(dft_shift[:, :, 0], dft_shift[:, :, 1]))
# 画图
plt.subplot(121), plt.imshow(img, cmap='gray')
plt.title('Input Image'), plt.xticks([]), plt.yticks([])
plt.subplot(122), plt.imshow(magnitude_spectrum, cmap='gray')
plt.title('Magnitude Spectrum'), plt.xticks([]), plt.yticks([])
plt.show()
def low_pass_filtering(image, radius):
"""
低通滤波函数
:param image: 输入图像
:param radius: 半径
:return: 滤波结果
"""
# 对图像进行傅里叶变换,fft是一个三维数组,fft[:, :, 0]为实数部分,fft[:, :, 1]为虚数部分
fft = cv2.dft(np.float32(image), flags=cv2.DFT_COMPLEX_OUTPUT)
# 对fft进行中心化,生成的dshift仍然是一个三维数组
dshift = np.fft.fftshift(fft)
# 得到中心像素
rows, cols = image.shape[:2]
mid_row, mid_col = int(rows / 2), int(cols / 2)
# 构建掩模,256位,两个通道
mask = np.zeros((rows, cols, 2), np.float32)
mask[mid_row - radius:mid_row + radius, mid_col - radius:mid_col + radius] = 1
# 给傅里叶变换结果乘掩模
fft_filtering = dshift * mask
# 傅里叶逆变换
ishift = np.fft.ifftshift(fft_filtering)
image_filtering = cv2.idft(ishift)
image_filtering = cv2.magnitude(image_filtering[:, :, 0], image_filtering[:, :, 1])
# 对逆变换结果进行归一化(一般对图像处理的最后一步都要进行归一化,特殊情况除外)
cv2.normalize(image_filtering, image_filtering, 0, 1, cv2.NORM_MINMAX)
return image_filtering
def high_pass_filtering(image, radius, n):
"""
高通滤波函数
:param image: 输入图像
:param radius: 半径
:param n: ButterWorth滤波器阶数
:return: 滤波结果
"""
# 对图像进行傅里叶变换,fft是一个三维数组,fft[:, :, 0]为实数部分,fft[:, :, 1]为虚数部分
fft = cv2.dft(np.float32(image), flags=cv2.DFT_COMPLEX_OUTPUT)
# 对fft进行中心化,生成的dshift仍然是一个三维数组
dshift = np.fft.fftshift(fft)
# 得到中心像素
rows, cols = image.shape[:2]
mid_row, mid_col = int(rows / 2), int(cols / 2)
# 构建ButterWorth高通滤波掩模
mask = np.zeros((rows, cols, 2), np.float32)
for i in range(0, rows):
for j in range(0, cols):
# 计算(i, j)到中心点的距离
d = math.sqrt(pow(i - mid_row, 2) + pow(j - mid_col, 2))
try:
mask[i, j, 0] = mask[i, j, 1] = 1 / (1 + pow(radius / d, 2 * n))
except ZeroDivisionError:
mask[i, j, 0] = mask[i, j, 1] = 0
# 给傅里叶变换结果乘掩模
fft_filtering = dshift * mask
# 傅里叶逆变换
ishift = np.fft.ifftshift(fft_filtering)
image_filtering = cv2.idft(ishift)
image_filtering = cv2.magnitude(image_filtering[:, :, 0], image_filtering[:, :, 1])
# 对逆变换结果进行归一化(一般对图像处理的最后一步都要进行归一化,特殊情况除外)
cv2.normalize(image_filtering, image_filtering, 0, 1, cv2.NORM_MINMAX)
return image_filtering
def bandpass_filter(image, radius, w, n=1):
"""
带通滤波函数
:param image: 输入图像
:param radius: 带中心到频率平面原点的距离
:param w: 带宽
:param n: 阶数
:return: 滤波结果
"""
# 对图像进行傅里叶变换,fft是一个三维数组,fft[:, :, 0]为实数部分,fft[:, :, 1]为虚数部分
fft = cv2.dft(np.float32(image), flags=cv2.DFT_COMPLEX_OUTPUT)
# 对fft进行中心化,生成的dshift仍然是一个三维数组
dshift = np.fft.fftshift(fft)
# 得到中心像素
rows, cols = image.shape[:2]
mid_row, mid_col = int(rows / 2), int(cols / 2)
# 构建掩模,256位,两个通道
mask = np.zeros((rows, cols, 2), np.float32)
for i in range(0, rows):
for j in range(0, cols):
# 计算(i, j)到中心点的距离
d = math.sqrt(pow(i - mid_row, 2) + pow(j - mid_col, 2))
if radius - w / 2 < d < radius + w / 2:
mask[i, j, 0] = mask[i, j, 1] = 1
else:
mask[i, j, 0] = mask[i, j, 1] = 0
# 给傅里叶变换结果乘掩模
fft_filtering = dshift * np.float32(mask)
# 傅里叶逆变换
ishift = np.fft.ifftshift(fft_filtering)
image_filtering = cv2.idft(ishift)
image_filtering = cv2.magnitude(image_filtering[:, :, 0], image_filtering[:, :, 1])
# 对逆变换结果进行归一化(一般对图像处理的最后一步都要进行归一化,特殊情况除外)
cv2.normalize(image_filtering, image_filtering, 0, 1, cv2.NORM_MINMAX)
return image_filtering
二、 对一副图像进行傅立叶变换,显示频谱
src = cv2.imread('img/lena.png')
dft(src)
三 、 取其5,50,80、150的频率,显示图像
if __name__ == "__main__":
image = cv2.imread("img/lena.png", 0)
image_low_pass_filtering5 = low_pass_filtering(image, 5)
image_low_pass_filtering50 = low_pass_filtering(image, 50)
image_low_pass_filtering80 = low_pass_filtering(image, 80)
image_low_pass_filtering150 = low_pass_filtering(image, 150)
plt.subplot(151), plt.imshow(image, 'gray'), plt.title("原图"), plt.xticks([]), plt.yticks([])
plt.subplot(152), plt.imshow(image_low_pass_filtering5, 'gray'), plt.title("5"), plt.xticks(
[]), plt.yticks([])
plt.subplot(153), plt.imshow(image_low_pass_filtering50, 'gray'), plt.title("50"), plt.xticks(
[]), plt.yticks([])
plt.subplot(154), plt.imshow(image_low_pass_filtering80, 'gray'), plt.title("80"), plt.xticks(
[]), plt.yticks([])
plt.subplot(155), plt.imshow(image_low_pass_filtering150, 'gray'), plt.title("150"), plt.xticks(
[]), plt.yticks([])
plt.show()
image_gaussian_noise = gaussian_noise(image, 0.1, 0.03)
image_sp_noise = sp_noise(image, 0.02)
image_low_pass_filtering1 = low_pass_filtering(image_gaussian_noise, 30)
image_high_pass_filtering1 = high_pass_filtering(image_gaussian_noise, 5, 1)
image_low_pass_filtering2 = low_pass_filtering(image_sp_noise, 50)
image_high_pass_filtering2 = high_pass_filtering(image_sp_noise, 10, 1)
# plt.subplot(241), plt.imshow(image, 'gray'), plt.title("原图"), plt.xticks([]), plt.yticks([])
plt.subplot(241), plt.imshow(image, 'gray'), plt.title("原图"), plt.xticks([]), plt.yticks([])
plt.subplot(242), plt.imshow(image_gaussian_noise, 'gray'), plt.title("高斯噪声"), plt.xticks(
[]), plt.yticks([])
plt.subplot(243), plt.imshow(image_low_pass_filtering1, 'gray'), plt.title("低通滤波(模糊、平滑)"), plt.xticks(
[]), plt.yticks([])
plt.subplot(244), plt.imshow(image_high_pass_filtering1, 'gray'), plt.title("高通滤波(锐化)"), plt.xticks(
[]), plt.yticks([])
plt.subplot(246), plt.imshow(image_sp_noise, 'gray'), plt.title("椒盐噪声"), plt.xticks(
[]), plt.yticks([])
plt.subplot(247), plt.imshow(image_low_pass_filtering2, 'gray'), plt.title("低通滤波(模糊、平滑)"), plt.xticks(
[]), plt.yticks([])
plt.subplot(248), plt.imshow(image_high_pass_filtering2, 'gray'), plt.title("高通滤波(锐化)"), plt.xticks([]), plt.yticks(
[])
plt.show()
四、 加噪声(高斯,椒盐)进行频率域平滑,锐化,观察图像变化
