
doi: 10.1007/bf01588252
Conjugate gradient methods have been extensively used to locate unconstrained minimum points of real-valued functions. At present, there are several readily implementable conjugate gradient algorithms that do not require exact line search and yet are shown to be superlinearly convergent. However, these existing algorithms usually require several trials to find an acceptable stepsize at each iteration, and their inexact line search can be very timeconsuming.
Methods of reduced gradient type, continuously differentiable objective function, inexact line search, Quadratic programming, global convergence, Approximation by rational functions, Numerical mathematical programming methods, Nonlinear programming, conjugate gradient method, unconstrained minimization, rate of convergence
Methods of reduced gradient type, continuously differentiable objective function, inexact line search, Quadratic programming, global convergence, Approximation by rational functions, Numerical mathematical programming methods, Nonlinear programming, conjugate gradient method, unconstrained minimization, rate of convergence
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