2002
DOI: 10.2172/800778
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LOCA 1.0 Library of Continuation Algorithms: Theory and Implementation Manual

Abstract: LOCA, the Library of Continuation Algorithms, is a software library for performing stability analysis of large-scale applications. LOC A enables the tracking of solution branches as a function of a system parameter, the direct tracking of bifurcation points, and, when linked with the ARPACK library, a linear stability analysis capability. It is designed to be easy to implement around codes that already use Newton's method to converge to steady-state solutions. The algorithms are chosen to work for large proble… Show more

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Cited by 73 publications
(103 citation statements)
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“…This capability has been verified and validated for numerous fluid flow applications and has demonstrated parallel scaling to millions of unknowns [12,13], and is briefly described in Section 2.3. The LOCA (Library of Continuation Algorithms) library [14] has also been interfaced with the MPSalsa code for directly calculating bifurcations [15]. A Newtonbased algorithm in LOCA is used to converge directly to the instability, converging the parameter value and solution simultaneously.…”
Section: 0604x10 5 =mentioning
confidence: 99%
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“…This capability has been verified and validated for numerous fluid flow applications and has demonstrated parallel scaling to millions of unknowns [12,13], and is briefly described in Section 2.3. The LOCA (Library of Continuation Algorithms) library [14] has also been interfaced with the MPSalsa code for directly calculating bifurcations [15]. A Newtonbased algorithm in LOCA is used to converge directly to the instability, converging the parameter value and solution simultaneously.…”
Section: 0604x10 5 =mentioning
confidence: 99%
“…6 is solved using Arnoldi's method with a version of the P_ARPACK software [10,11] driven by software in the LOCA library for performing the generalized Cayley transformation [14]. The approximate matrix inversions are solved using the Aztec package, exactly the same as in the Newton iterations.…”
Section: Linear Stability Analysis Algorithmsmentioning
confidence: 99%
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“…More information about continuation methods (for both real and homotopy parameters) can be found from Salinger et al [192].…”
Section: Homotopymentioning
confidence: 99%
“…We discuss a practical algorithm in LOCA [54,55] for solving this system. It is called a bordered algorithm, and it may be derived from a block elimination procedure.…”
Section: Bordered Algorithmmentioning
confidence: 99%