# nonlinear

 C05NBF Solution of system of nonlinear equations using function values only (easy-to-use) C05NCF Solution of system of nonlinear equations using function values only (comprehensive) C05NDF Solution of system of nonlinear equations using function values only (reverse communication) C05PBF Solution of system of nonlinear equations using first derivatives (easy-to-use) C05PCF Solution of system of nonlinear equations using first derivatives (comprehensive) C05PDF Solution of system of nonlinear equations using first derivatives (reverse communication) D02GAF ODEs, boundary value problem, finite difference technique with deferred correction, simple nonlinear problem D02RAF ODEs, general nonlinear boundary value problem, finite difference technique with deferred correction, continuation facility D02TKF ODEs, general nonlinear boundary value problem, collocation technique D02TVF ODEs, general nonlinear boundary value problem, setup for D02TKF D02TXF ODEs, general nonlinear boundary value problem, continuation facility for D02TKF D02TYF ODEs, general nonlinear boundary value problem, interpolation for D02TKF D02TZF ODEs, general nonlinear boundary value problem, diagnostics for D02TKF D05BAF Nonlinear Volterra convolution equation, second kind D05BDF Nonlinear convolution Volterra–Abel equation, second kind, weakly singular D05BEF Nonlinear convolution Volterra–Abel equation, first kind, weakly singular E04UCF Minimum, function of several variables, sequential QP method, nonlinear constraints, using function values and optionally first derivatives (forward communication, comprehensive) E04UFF Minimum, function of several variables, sequential QP method, nonlinear constraints, using function values and optionally first derivatives (reverse communication, comprehensive) E04USF Minimum of a sum of squares, nonlinear constraints, sequential QP method, using function values and optionally first derivatives (comprehensive) E04YCF Covariance matrix for nonlinear least-squares problem (unconstrained)

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© The Numerical Algorithms Group Ltd, Oxford UK. 2001