Is there a method in numpy for calculating the Mean Squared Error between two matrices?
I've tried searching but found none. Is it under a different name?
If there isn't, how do you overcome this? Do you write it yourself or use a different lib?
Is there a method in numpy for calculating the Mean Squared Error between two matrices?
I've tried searching but found none. Is it under a different name?
If there isn't, how do you overcome this? Do you write it yourself or use a different lib?
You can use:
mse = ((A - B)**2).mean(axis=ax)
Or
mse = (np.square(A - B)).mean(axis=ax)
ax=0
the average is performed along the row, for each column, returning an arrayax=1
the average is performed along the column, for each row, returning an arrayax=None
the average is performed element-wise along the array, returning a scalar valuenp.ndarray
will do an element-wise multiplication for a**2
, but using a np.matrixlib.defmatrix.matrix
will do a matrix multiplication for a**2
...
– Saullo G. P. Castro
Apr 21 '14 at 18:41
Acmp = np.array(A, dtype=int)
)
– Charles L.
Nov 1 '15 at 21:02
This isn't part of numpy
, but it will work with numpy.ndarray
objects. A numpy.matrix
can be converted to a numpy.ndarray
and a numpy.ndarray
can be converted to a numpy.matrix
.
from sklearn.metrics import mean_squared_error
mse = mean_squared_error(A, B)
See Scikit Learn mean_squared_error for documentation on how to control axis.
Even more numpy
np.square(np.subtract(A, B)).mean()
Another alternative to the accepted answer that avoids any issues with matrix multiplication:
def MSE(Y, YH):
return np.square(Y - YH).mean()
From the documents for np.square: "Return the element-wise square of the input."
The standard numpy methods for calculation mean squared error (variance) and its square root (standard deviation) are numpy.var()
and numpy.std()
, see here and here. They apply to matrices and have the same syntax as numpy.mean()
.
I suppose that the question and the preceding answers might have been posted before these functions became available.
((A - B) ** 2).mean(axis=ax)
, whereax=0
is per-column,ax=1
is per-row andax=None
gives a grand total. – Fred Foo May 27 '13 at 14:13