我正在寻找一个函数,它将两个列表作为输入,并返回Pearson correlation,以及相关的重要性。
答案 0 :(得分:185)
您可以查看scipy.stats:
from pydoc import help
from scipy.stats.stats import pearsonr
help(pearsonr)
>>>
Help on function pearsonr in module scipy.stats.stats:
pearsonr(x, y)
Calculates a Pearson correlation coefficient and the p-value for testing
non-correlation.
The Pearson correlation coefficient measures the linear relationship
between two datasets. Strictly speaking, Pearson's correlation requires
that each dataset be normally distributed. Like other correlation
coefficients, this one varies between -1 and +1 with 0 implying no
correlation. Correlations of -1 or +1 imply an exact linear
relationship. Positive correlations imply that as x increases, so does
y. Negative correlations imply that as x increases, y decreases.
The p-value roughly indicates the probability of an uncorrelated system
producing datasets that have a Pearson correlation at least as extreme
as the one computed from these datasets. The p-values are not entirely
reliable but are probably reasonable for datasets larger than 500 or so.
Parameters
----------
x : 1D array
y : 1D array the same length as x
Returns
-------
(Pearson's correlation coefficient,
2-tailed p-value)
References
----------
http://www.statsoft.com/textbook/glosp.html#Pearson%20Correlation
答案 1 :(得分:99)
Pearson相关性可以用numpy的corrcoef来计算。
import numpy
numpy.corrcoef(list1, list2)[0, 1]
答案 2 :(得分:46)
替代方案可以是来自linregress的本地scipy函数,它计算:
斜率:回归线的斜率
拦截:回归线的拦截
r值:相关系数
p值:假设检验的双边p值,其零假设是斜率为零
stderr:估算的标准误差
这是一个例子:
a = [15, 12, 8, 8, 7, 7, 7, 6, 5, 3]
b = [10, 25, 17, 11, 13, 17, 20, 13, 9, 15]
from scipy.stats import linregress
linregress(a, b)
会回复你:
LinregressResult(slope=0.20833333333333337, intercept=13.375, rvalue=0.14499815458068521, pvalue=0.68940144811669501, stderr=0.50261704627083648)
答案 3 :(得分:34)
如果您不想安装scipy,我已经使用了这个快速入侵,稍微修改了Programming Collective Intelligence:
(编辑正确。)
from itertools import imap
def pearsonr(x, y):
# Assume len(x) == len(y)
n = len(x)
sum_x = float(sum(x))
sum_y = float(sum(y))
sum_x_sq = sum(map(lambda x: pow(x, 2), x))
sum_y_sq = sum(map(lambda x: pow(x, 2), y))
psum = sum(imap(lambda x, y: x * y, x, y))
num = psum - (sum_x * sum_y/n)
den = pow((sum_x_sq - pow(sum_x, 2) / n) * (sum_y_sq - pow(sum_y, 2) / n), 0.5)
if den == 0: return 0
return num / den
答案 4 :(得分:30)
以下代码是the definition的直接解释:
import math
def average(x):
assert len(x) > 0
return float(sum(x)) / len(x)
def pearson_def(x, y):
assert len(x) == len(y)
n = len(x)
assert n > 0
avg_x = average(x)
avg_y = average(y)
diffprod = 0
xdiff2 = 0
ydiff2 = 0
for idx in range(n):
xdiff = x[idx] - avg_x
ydiff = y[idx] - avg_y
diffprod += xdiff * ydiff
xdiff2 += xdiff * xdiff
ydiff2 += ydiff * ydiff
return diffprod / math.sqrt(xdiff2 * ydiff2)
测试:
print pearson_def([1,2,3], [1,5,7])
返回
0.981980506062
这与Excel this calculator,SciPy(也是NumPy)一致,它们分别返回0.981980506和0.9819805060619657以及0.98198050606196574。
R:
> cor( c(1,2,3), c(1,5,7))
[1] 0.9819805
编辑:修正了评论者指出的错误。
答案 5 :(得分:22)
您也可以使用pandas.DataFrame.corr执行此操作:
import pandas as pd
a = [[1, 2, 3],
[5, 6, 9],
[5, 6, 11],
[5, 6, 13],
[5, 3, 13]]
df = pd.DataFrame(data=a)
df.corr()
这给出了
0 1 2
0 1.000000 0.745601 0.916579
1 0.745601 1.000000 0.544248
2 0.916579 0.544248 1.000000
答案 6 :(得分:12)
我认为我的答案应该是最简单的编码和理解计算Pearson相关系数(PCC)的步骤,而不是依赖于numpy / scipy。
import math
# calculates the mean
def mean(x):
sum = 0.0
for i in x:
sum += i
return sum / len(x)
# calculates the sample standard deviation
def sampleStandardDeviation(x):
sumv = 0.0
for i in x:
sumv += (i - mean(x))**2
return math.sqrt(sumv/(len(x)-1))
# calculates the PCC using both the 2 functions above
def pearson(x,y):
scorex = []
scorey = []
for i in x:
scorex.append((i - mean(x))/sampleStandardDeviation(x))
for j in y:
scorey.append((j - mean(y))/sampleStandardDeviation(y))
# multiplies both lists together into 1 list (hence zip) and sums the whole list
return (sum([i*j for i,j in zip(scorex,scorey)]))/(len(x)-1)
PCC的重要性基本上是为了向您展示两个变量/列表的强相关性。 值得注意的是,PCC值的范围从-1到1 。 0到1之间的值表示正相关。 值0 =最高变化(无任何相关性)。 -1到0之间的值表示负相关。
答案 7 :(得分:7)
嗯,这些回复很多都有很长很难阅读的代码......
我建议在使用数组时使用numpy及其漂亮的功能:
import numpy as np
def pcc(X, Y):
''' Compute Pearson Correlation Coefficient. '''
# Normalise X and Y
X -= X.mean(0)
Y -= Y.mean(0)
# Standardise X and Y
X /= X.std(0)
Y /= Y.std(0)
# Compute mean product
return np.mean(X*Y)
# Using it on a random example
from random import random
X = np.array([random() for x in xrange(100)])
Y = np.array([random() for x in xrange(100)])
pcc(X, Y)
答案 8 :(得分:6)
这是使用numpy:
的Pearson Correlation函数的实现
def corr(data1, data2):
"data1 & data2 should be numpy arrays."
mean1 = data1.mean()
mean2 = data2.mean()
std1 = data1.std()
std2 = data2.std()
# corr = ((data1-mean1)*(data2-mean2)).mean()/(std1*std2)
corr = ((data1*data2).mean()-mean1*mean2)/(std1*std2)
return corr
答案 9 :(得分:5)
这是mkh答案的变体,运行速度比它快得多,scipy.stats.pearsonr使用numba。
import numba
@numba.jit
def corr(data1, data2):
M = data1.size
sum1 = 0.
sum2 = 0.
for i in range(M):
sum1 += data1[i]
sum2 += data2[i]
mean1 = sum1 / M
mean2 = sum2 / M
var_sum1 = 0.
var_sum2 = 0.
cross_sum = 0.
for i in range(M):
var_sum1 += (data1[i] - mean1) ** 2
var_sum2 += (data2[i] - mean2) ** 2
cross_sum += (data1[i] * data2[i])
std1 = (var_sum1 / M) ** .5
std2 = (var_sum2 / M) ** .5
cross_mean = cross_sum / M
return (cross_mean - mean1 * mean2) / (std1 * std2)
答案 10 :(得分:5)
在python中使用熊猫计算皮尔逊系数: 我建议尝试这种方法,因为您的数据包含列表。与数据进行交互并从控制台对其进行操作很容易,因为您可以可视化数据结构并根据需要进行更新。您还可以导出数据集并保存它,并从python控制台中添加新数据以供以后分析。此代码更简单,并且包含更少的代码行。我假设您需要一些快速的代码行来筛选数据以进行进一步分析
示例:
data = {'list 1':[2,4,6,8],'list 2':[4,16,36,64]}
import pandas as pd #To Convert your lists to pandas data frames convert your lists into pandas dataframes
df = pd.DataFrame(data, columns = ['list 1','list 2'])
from scipy import stats # For in-built method to get PCC
pearson_coef, p_value = stats.pearsonr(df["list 1"], df["list 2"]) #define the columns to perform calculations on
print("Pearson Correlation Coefficient: ", pearson_coef, "and a P-value of:", p_value) # Results
但是,您没有为我发布数据以查看分析之前可能需要的数据集大小或转换。
答案 11 :(得分:4)
这是基于稀疏向量的皮尔逊相关的实现。这里的向量表示为表示为(索引,值)的元组列表。两个稀疏矢量可以具有不同的长度,但是在所有矢量大小上必须是相同的。这对于文本挖掘应用是有用的,其中矢量大小非常大,因为大多数特征是单词包,因此通常使用稀疏矢量执行计算。
def get_pearson_corelation(self, first_feature_vector=[], second_feature_vector=[], length_of_featureset=0):
indexed_feature_dict = {}
if first_feature_vector == [] or second_feature_vector == [] or length_of_featureset == 0:
raise ValueError("Empty feature vectors or zero length of featureset in get_pearson_corelation")
sum_a = sum(value for index, value in first_feature_vector)
sum_b = sum(value for index, value in second_feature_vector)
avg_a = float(sum_a) / length_of_featureset
avg_b = float(sum_b) / length_of_featureset
mean_sq_error_a = sqrt((sum((value - avg_a) ** 2 for index, value in first_feature_vector)) + ((
length_of_featureset - len(first_feature_vector)) * ((0 - avg_a) ** 2)))
mean_sq_error_b = sqrt((sum((value - avg_b) ** 2 for index, value in second_feature_vector)) + ((
length_of_featureset - len(second_feature_vector)) * ((0 - avg_b) ** 2)))
covariance_a_b = 0
#calculate covariance for the sparse vectors
for tuple in first_feature_vector:
if len(tuple) != 2:
raise ValueError("Invalid feature frequency tuple in featureVector: %s") % (tuple,)
indexed_feature_dict[tuple[0]] = tuple[1]
count_of_features = 0
for tuple in second_feature_vector:
count_of_features += 1
if len(tuple) != 2:
raise ValueError("Invalid feature frequency tuple in featureVector: %s") % (tuple,)
if tuple[0] in indexed_feature_dict:
covariance_a_b += ((indexed_feature_dict[tuple[0]] - avg_a) * (tuple[1] - avg_b))
del (indexed_feature_dict[tuple[0]])
else:
covariance_a_b += (0 - avg_a) * (tuple[1] - avg_b)
for index in indexed_feature_dict:
count_of_features += 1
covariance_a_b += (indexed_feature_dict[index] - avg_a) * (0 - avg_b)
#adjust covariance with rest of vector with 0 value
covariance_a_b += (length_of_featureset - count_of_features) * -avg_a * -avg_b
if mean_sq_error_a == 0 or mean_sq_error_b == 0:
return -1
else:
return float(covariance_a_b) / (mean_sq_error_a * mean_sq_error_b)
单元测试:
def test_get_get_pearson_corelation(self):
vector_a = [(1, 1), (2, 2), (3, 3)]
vector_b = [(1, 1), (2, 5), (3, 7)]
self.assertAlmostEquals(self.sim_calculator.get_pearson_corelation(vector_a, vector_b, 3), 0.981980506062, 3, None, None)
vector_a = [(1, 1), (2, 2), (3, 3)]
vector_b = [(1, 1), (2, 5), (3, 7), (4, 14)]
self.assertAlmostEquals(self.sim_calculator.get_pearson_corelation(vector_a, vector_b, 5), -0.0137089240555, 3, None, None)
答案 12 :(得分:1)
您可以查看这篇文章。这是一个详细记录的示例,用于使用pandas库(对于Python)基于来自多个文件的历史外汇货币对数据计算相关性,然后使用seaborn库生成热图图。
http://www.tradinggeeks.net/2015/08/calculating-correlation-in-python/
答案 13 :(得分:1)
您可能想知道如何在寻找特定方向的相关性(负相关或正相关)的背景下解释您的概率。这是我写的一个函数来帮助它。它甚至可能是对的!
这是基于我从http://www.vassarstats.net/rsig.html和http://en.wikipedia.org/wiki/Student%27s_t_distribution收集的信息,感谢此处发布的其他答案。
# Given (possibly random) variables, X and Y, and a correlation direction,
# returns:
# (r, p),
# where r is the Pearson correlation coefficient, and p is the probability
# that there is no correlation in the given direction.
#
# direction:
# if positive, p is the probability that there is no positive correlation in
# the population sampled by X and Y
# if negative, p is the probability that there is no negative correlation
# if 0, p is the probability that there is no correlation in either direction
def probabilityNotCorrelated(X, Y, direction=0):
x = len(X)
if x != len(Y):
raise ValueError("variables not same len: " + str(x) + ", and " + \
str(len(Y)))
if x < 6:
raise ValueError("must have at least 6 samples, but have " + str(x))
(corr, prb_2_tail) = stats.pearsonr(X, Y)
if not direction:
return (corr, prb_2_tail)
prb_1_tail = prb_2_tail / 2
if corr * direction > 0:
return (corr, prb_1_tail)
return (corr, 1 - prb_1_tail)
答案 14 :(得分:1)
I have a very simple and easy to understand solution for this. For two arrays of equal length, Pearson coefficient can be easily computed as follows:
def manual_pearson(a,b):
"""
Accepts two arrays of equal length, and computes correlation coefficient.
Numerator is the sum of product of (a - a_avg) and (b - b_avg),
while denominator is the product of a_std and b_std multiplied by
length of array.
"""
a_avg, b_avg = np.average(a), np.average(b)
a_stdev, b_stdev = np.std(a), np.std(b)
n = len(a)
denominator = a_stdev * b_stdev * n
numerator = np.sum(np.multiply(a-a_avg, b-b_avg))
p_coef = numerator/denominator
return p_coef
答案 15 :(得分:0)
def pearson(x,y):
n=len(x)
vals=range(n)
sumx=sum([float(x[i]) for i in vals])
sumy=sum([float(y[i]) for i in vals])
sumxSq=sum([x[i]**2.0 for i in vals])
sumySq=sum([y[i]**2.0 for i in vals])
pSum=sum([x[i]*y[i] for i in vals])
# Calculating Pearson correlation
num=pSum-(sumx*sumy/n)
den=((sumxSq-pow(sumx,2)/n)*(sumySq-pow(sumy,2)/n))**.5
if den==0: return 0
r=num/den
return r
答案 16 :(得分:0)
从Python 3.10 release schedule开始,皮尔逊相关系数(statistics.correlation)在标准库中直接可用:
from statistics import correlation
# a = [15, 12, 8, 8, 7, 7, 7, 6, 5, 3]
# b = [10, 25, 17, 11, 13, 17, 20, 13, 9, 15]
correlation(a, b)
# 0.1449981545806852