Convergence across alternative methods for forming strategic groups

x,,, -J, m = 1, 2, 3 . . be an iteration method for solving the nonlinear problem F(X) = 0, where F(X) and its derivatives possess all of the properties required by T(x,,,). Then ifit can be established thatfor the problem at hand jlF(~,+ 1)i/ < &,, llF(x& V m > M,, (M, < co) and 0 < &,, < 1, dejini

The purpose of the paper is threefold: Ž . 1 To develop a useful error bound for the method of alternating projections which is relatively easy to compute and remember; Ž . 2 To exhibit a counterexample to a conjecture of Kayalar and Weinert; Ž . Ž . 3 To show that in the case of at least three

This paper considers the nwnerical solution of the eEZiptic seZf-adjoint second order and the biharmonic equations using a variety of accelerated versions of the Modified Alternating Direction Preconditioning (MADPi method developed in [4]. The resulting iterative schemes possess rates of convergenc

## Abstract The four different schemes of Group Explicit Method (GEM): GER, GEL, SAGE and DAGE have been claimed to be unstable when employed for electrochemical digital simulations with large model diffusion coefficient __D__~M~. However, in this investigation, in spite of the conditional stabilit