scipy.optimize.approx_fprime(xk, f, epsilon, *args)[source]

Finite-difference approximation of the gradient of a scalar function.

xk : array_like

The coordinate vector at which to determine the gradient of f.

f : callable

The function of which to determine the gradient (partial derivatives). Should take xk as first argument, other arguments to f can be supplied in *args. Should return a scalar, the value of the function at xk.

epsilon : array_like

Increment to xk to use for determining the function gradient. If a scalar, uses the same finite difference delta for all partial derivatives. If an array, should contain one value per element of xk.

*args : args, optional

Any other arguments that are to be passed to f.

grad : ndarray

The partial derivatives of f to xk.

See also

Check correctness of gradient function against approx_fprime.


The function gradient is determined by the forward finite difference formula:

         f(xk[i] + epsilon[i]) - f(xk[i])
f'[i] = ---------------------------------

The main use of approx_fprime is in scalar function optimizers like fmin_bfgs, to determine numerically the Jacobian of a function.


>>> from scipy import optimize
>>> def func(x, c0, c1):
...     "Coordinate vector `x` should be an array of size two."
...     return c0 * x[0]**2 + c1*x[1]**2
>>> x = np.ones(2)
>>> c0, c1 = (1, 200)
>>> eps = np.sqrt(np.finfo(float).eps)
>>> optimize.approx_fprime(x, func, [eps, np.sqrt(200) * eps], c0, c1)
array([   2.        ,  400.00004198])

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