.. default-domain:: cpp .. cpp:namespace:: ceres .. _chapter-spivak_notation: =============== Spivak Notation =============== To preserve our collective sanities, we will use Spivak's notation for derivatives. It is a functional notation that makes reading and reasoning about expressions involving derivatives simple. For a univariate function :math:`f`, :math:`f(a)` denotes its value at :math:`a`. :math:`Df` denotes its first derivative, and :math:`Df(a)` is the derivative evaluated at :math:`a`, i.e .. math:: Df(a) = \left . \frac{d}{dx} f(x) \right |_{x = a} :math:`D^kf` denotes the :math:`k^{\text{th}}` derivative of :math:`f`. For a bi-variate function :math:`g(x,y)`. :math:`D_1g` and :math:`D_2g` denote the partial derivatives of :math:`g` w.r.t the first and second variable respectively. In the classical notation this is equivalent to saying: .. math:: D_1 g = \frac{\partial}{\partial x}g(x,y) \text{ and } D_2 g = \frac{\partial}{\partial y}g(x,y). :math:`Dg` denotes the Jacobian of `g`, i.e., .. math:: Dg = \begin{bmatrix} D_1g & D_2g \end{bmatrix} More generally for a multivariate function :math:`g:\mathbb{R}^n \longrightarrow \mathbb{R}^m`, :math:`Dg` denotes the :math:`m\times n` Jacobian matrix. :math:`D_i g` is the partial derivative of :math:`g` w.r.t the :math:`i^{\text{th}}` coordinate and the :math:`i^{\text{th}}` column of :math:`Dg`. Finally, :math:`D^2_1g` and :math:`D_1D_2g` have the obvious meaning as higher order partial derivatives. For more see Michael Spivak's book `Calculus on Manifolds `_ or a brief discussion of the `merits of this notation `_ by Mitchell N. Charity.