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Line 5: {{AfC submission\|t\|\|ts=20230126112013\|u=MtPenguinMonster\|ns=118\|demo=}}<!-- Important, do not remove this line before article has been created. --> In [[numerical linear algebra]], the '''conjugate gradient squared method (CGS)''' is an [[iterative method\|iterative]] algorithm for solving systems of linear equations of the form <math>Ax = b</math>, particularly in cases where computing <math>A^T</math> is impractical.<ref>{{cite web\|title=Conjugate Gradient Squared Method\|author=Wolfram Mathworld\|url=https://mathworld.wolfram.com/ConjugateGradientSquaredMethod.html}}</ref> The CGS method was developed as an improvement to the [[Biconjugate gradient method]].<ref>{{cite web\|title=cgs\|author=Mathworks\|url=https://au.mathworks.com/help/matlab/ref/cgs.html}}</ref><ref>{{cite book\|author=[[Henk van der Vorst]]\|title=Iterative Krylov Methods for Large Linear Systems\|chapter=Bi-Conjugate Gradients\|year=2003\|publisher=Cambridge University Press \|isbn=0-521-81828-1}}</ref><ref>{{cite journal\|title=CGS, A Fast Lanczos-Type Solver for Nonsymmetric Linear systems\|url=https://www.proquest.com/docview/921988114\|access=subscription}}</ref> == The Algorithm ==

Conjugate gradient squared method: Difference between revisions