h3_rmshe¶

Compute the H3 root mean square error.

\[H_3 = \frac {S_i-O_i}{\frac{1}{2}(S_i+O_i)}\]

\[\text{Root Mean Squared H Error} = \sqrt{\frac {1}{n}\sum_{i=1}^{n} H^2}\]

Range:

Notes:

Parameters:

simulated_array – An array of simulated data from the time series.
observed_array – An array of observed data from the time series.
replace_nan – If given, indicates which value to replace NaN values with in the two arrays. If None, when a NaN value is found at the i-th position in the observed OR simulated array, the i-th value of the observed and simulated array are removed before the computation.
replace_inf – If given, indicates which value to replace Inf values with in the two arrays. If None, when an inf value is found at the i-th position in the observed OR simulated array, the i-th value of the observed and simulated array are removed before the computation.
remove_neg – If True, when a negative value is found at the i-th position in the observed OR simulated array, the i-th value of the observed AND simulated array are removed before the computation.
remove_zero – If true, when a zero value is found at the i-th position in the observed OR simulated array, the i-th value of the observed AND simulated array are removed before the computation.

Return type:

The root mean square H3 error.

Examples

>>> import HydroErr as he
>>> import numpy as np

>>> sim = np.array([5, 7, 9, 2, 4.5, 6.7])
>>> obs = np.array([4.7, 6, 10, 2.5, 4, 7])
>>> he.h3_rmshe(sim, obs)
0.13147667616722278

References

Tornquist, L., Vartia, P., Vartia, Y.O., 1985. How Should Relative Changes be Measured? The American Statistician 43-46.