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Second- and higher-order derivatives are required by applications in scientific computation, especially for optimization algorithms. The two complementary concepts of interpolating partial derivatives from univariate Taylor series and preaccumulating of local derivatives form the mathematical foundations for accurate, efficient computation of second- and higher-order partial derivatives for large codes. We compute derivatives in a fashion that parallelizes well, exploits sparsity or other structure frequently found in Hessian matrices, can compute only selected elements of a Hessian matrix, and computes Hessian x vector products.
Bischof et al. (Fri,) studied this question.