AbstractA formal algorithm is given for the systematic exact evaluation of higher order partial derivatives of functions of many variables. The algorithm improves upon Wengert's method in two key respects. Applications are envisioned wherever gradients, Jacobians, Hessians, and power series expansions could be employed
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/97061/1/AIAA2012-1589.pd
AbstractThis paper considers the partial differential problem of two types of multivariable function...
The Taylor series method is one of the earliest analytic-numeric algorithms for approximate solution...
AbstractA formal algorithm is given for the systematic exact evaluation of higher order partial deri...
AbstractIn a recent paper an algorithm FEED was introduced for the systematic exact evaluation of hi...
In 1983 an algorithm ~ was introduced for the systematic exact evaluation of higher-order partial de...
A method is presented for computing all higher-order partial derivatives of a multivariate function ...
The computations of the high-order partial derivatives in a given problem are in general te-dious or...
Second- and higher-order derivatives are required by applications in scientic computation, espe-cial...
A method is presented for computing all higher-order partial derivatives of a multivariate function...
AbstractA new type of Taylor series based finite difference approximations of higher-degree derivati...
A variety of strategies are used to construct algorithms for solving equations. However, higher orde...
80 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1980.If the gradient of the functio...
AbstractRecently, a new approach has been proposed to efficiently compute the accurate values of par...
Wagner M, Walther A, Schaefer B-J. On the efficient computation of high-order derivatives for implic...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/97061/1/AIAA2012-1589.pd
AbstractThis paper considers the partial differential problem of two types of multivariable function...
The Taylor series method is one of the earliest analytic-numeric algorithms for approximate solution...
AbstractA formal algorithm is given for the systematic exact evaluation of higher order partial deri...
AbstractIn a recent paper an algorithm FEED was introduced for the systematic exact evaluation of hi...
In 1983 an algorithm ~ was introduced for the systematic exact evaluation of higher-order partial de...
A method is presented for computing all higher-order partial derivatives of a multivariate function ...
The computations of the high-order partial derivatives in a given problem are in general te-dious or...
Second- and higher-order derivatives are required by applications in scientic computation, espe-cial...
A method is presented for computing all higher-order partial derivatives of a multivariate function...
AbstractA new type of Taylor series based finite difference approximations of higher-degree derivati...
A variety of strategies are used to construct algorithms for solving equations. However, higher orde...
80 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1980.If the gradient of the functio...
AbstractRecently, a new approach has been proposed to efficiently compute the accurate values of par...
Wagner M, Walther A, Schaefer B-J. On the efficient computation of high-order derivatives for implic...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/97061/1/AIAA2012-1589.pd
AbstractThis paper considers the partial differential problem of two types of multivariable function...
The Taylor series method is one of the earliest analytic-numeric algorithms for approximate solution...