Bibliography¶
[Adam98] | Adams, Mark. “A parallel maximal independent set algorithm”, in Proceedings 5th copper mountain conference on iterative methods, 1998. |
[AnCD15] | Anzt, Hartwig, Edmond Chow, and Jack Dongarra. “Iterative sparse triangular solves for preconditioning.” European Conference on Parallel Processing. Springer Berlin Heidelberg, 2015. |
[BaJM05] | Baker, A. H., Jessup, E. R., & Manteuffel, T. (2005). A technique for accelerating the convergence of restarted GMRES. SIAM Journal on Matrix Analysis and Applications, 26(4), 962-984. |
[Barr94] | Barrett, Richard, et al. Templates for the solution of linear systems: building blocks for iterative methods. Vol. 43. Siam, 1994. |
[BrGr02] | Bröker, Oliver, and Marcus J. Grote. “Sparse approximate inverse smoothers for geometric and algebraic multigrid.” Applied numerical mathematics 41.1 (2002): 61-80. |
[BrMH85] | Brandt, A., McCormick, S., & Huge, J. (1985). Algebraic multigrid (AMG) for sparse matrix equations. Sparsity and its Applications, 257. |
[CaGP73] | Caretto, L. S., et al. “Two calculation procedures for steady, three-dimensional flows with recirculation.” Proceedings of the third international conference on numerical methods in fluid mechanics. Springer Berlin Heidelberg, 1973. |
[DeSh12] | Demidov, D. E., and Shevchenko, D. V. “Modification of algebraic multigrid for effective GPGPU-based solution of nonstationary hydrodynamics problems.” Journal of Computational Science 3.6 (2012): 460-462. |
[Fokk96] | Fokkema, Diederik R. “Enhanced implementation of BiCGstab (l) for solving linear systems of equations.” Universiteit Utrecht. Mathematisch Instituut, 1996. |
[FrVu01] | Frank, Jason, and Cornelis Vuik. “On the construction of deflation-based preconditioners.” SIAM Journal on Scientific Computing 23.2 (2001): 442-462. |
[GiSo11] | Van Gijzen, Martin B., and Peter Sonneveld. “Algorithm 913: An elegant IDR (s) variant that efficiently exploits biorthogonality properties.” ACM Transactions on Mathematical Software (TOMS) 38.1 (2011): 5. |
[Saad03] | Saad, Yousef. Iterative methods for sparse linear systems. Siam, 2003. |
[SaTu08] | Sala, Marzio, and Raymond S. Tuminaro. “A new Petrov-Galerkin smoothed aggregation preconditioner for nonsymmetric linear systems.” SIAM Journal on Scientific Computing 31.1 (2008): 143-166. |
[SlDi93] | Sleijpen, Gerard LG, and Diederik R. Fokkema. “BiCGstab (l) for linear equations involving unsymmetric matrices with complex spectrum.” Electronic Transactions on Numerical Analysis 1.11 (1993): 2000. |
[Stue07] | Stüben, Klaus, et al. “Algebraic multigrid methods (AMG) for the efficient solution of fully implicit formulations in reservoir simulation.” SPE Reservoir Simulation Symposium. Society of Petroleum Engineers, 2007. |
[Stue99] | Stüben, Klaus. Algebraic multigrid (AMG): an introduction with applications. GMD-Forschungszentrum Informationstechnik, 1999. |
[TrOS01] | Trottenberg, U., Oosterlee, C., and Schüller, A. Multigrid. Academic Press, London, 2001. |
[VaMB96] | Vaněk, Petr, Jan Mandel, and Marian Brezina. “Algebraic multigrid by smoothed aggregation for second and fourth order elliptic problems.” Computing 56.3 (1996): 179-196. |