Lines Matching refs:Jacobian

73    evaluated analytically. Computing the Jacobian in such cases is
93    is the invertible Jacobian of :math:`f` at :math:`x`. Then the
94    Jacobian :math:`Df^{-1}(y) = [Df(x)]^{-1}`, i.e., the Jacobian of
95    the :math:`f^{-1}` is the inverse of the Jacobian of :math:`f`.
98    f^{-1}(y)` by whatever means you can. Evaluate the Jacobian of
99    :math:`f` at :math:`x`. If the Jacobian matrix is invertible, then
100    the inverse is the Jacobian of the inverse at :math:`y`.
135    2. For general sparse problems (i.e., the Jacobian matrix has a
212        Jacobian evaluation                   0.361
231        Jacobian evaluation                   0.361
263        Jacobian evaluation                   0.344