Revision as of 08:55, 24 September 2023 edit Citation bot (talk \| contribs) Bots 5,861,803 edits Alter: pages. Add: id. Formatted dashes. \| Use this bot. Report bugs. \| Suggested by Лисан аль-Гаиб \| #UCB_webform 279/544 ← Previous edit		Revision as of 20:01, 4 November 2023 edit undo TechnoSquirrel69 (talk \| contribs) Autopatrolled, Extended confirmed users, Page movers, Mass message senders, New page reviewers, Pending changes reviewers, Rollbackers, Temporary account IP viewers 31,589 edits Declining submission: context - Submission provides insufficient context (AFCH 0.9.1) Next edit →
Line 1: {{AFC submission\|d\|context\|u=MtPenguinMonster\|ns=118\|decliner=TechnoSquirrel69\|declinets=20231104200137\|ts=20230923053512}} <!-- Do not remove this line! --> {{AFC comment\|1=Thanks for your submission! I'm going to have to decline this for now as the draft is essentially just a statement of the algorithm with no explanation. This is not useful as an encyclopedic reference, as the [[WP:MTAU\|significant technical language]] makes it difficult to read for anyone other than people familiar with the subject. Let me know if you have any questions! <span class="nowrap">—[[User:TechnoSquirrel69\|TechnoSquirrel69]]</span> ([[User talk:TechnoSquirrel69\|sigh]]) 20:01, 4 November 2023 (UTC)}} ---- {{Short description\|Algorithm for solving matrix-vector equations}} {{Draft topics\|computing\|mathematics}} {{AfC topic\|stem}} ~~{{AfC submission\|\|\|ts=20230923053512\|u=MtPenguinMonster\|ns=118}}~~ ~~{{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\|author1=Noel Black\|author2=Shirley Moore\|publisher=[[MathWorld\|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\|author=Peter Sonneveld\|journal=SIAM Journal on Scientific and Statistical Computing\|volume=10\|issue=1\|pages=36–52\|date=1989\|url=https://www.proquest.com/docview/921988114\|url-access=limited\|doi=10.1137/0910004\|id={{ProQuest\|921988114}} }}</ref>

Conjugate gradient squared method: Difference between revisions