Articles dans des revues avec comité de lecture (24)
  1. 13. Napov, A., & Notay, Y. (2016). An efficient multigrid method for graph Laplacian systems. Electronic transactions on numerical analysis, 45, 201-218.
  2. 14. Napov, A., & Li, X. (2016). An algebraic multifrontal preconditioner that exploits the low-rank property. Numerical linear algebra with applications, 23, 61-82. doi:10.1002/nla.2006
  3. 15. Napov, A., Notay, Y., & Vandewalle, S. (2016). Special Issue on Multigrid Methods. Computing and visualization in science, 17(3), 109. doi:10.1007/s00791-015-0255-x
  4. 16. Notay, Y., & Napov, A. (2015). A massively parallel solver for discrete Poisson-like problems. Journal of computational physics, 281, 237-250. doi:10.1016/j.jcp.2014.10.043
  5. 17. Napov, A., & Notay, Y. (2014). Algebraic multigrid for moderate order finite elements. SIAM journal on scientific computing, 36, A1678-A1707. doi:10.1137/130922616
  6. 18. Notay, Y., & Napov, A. (2013). Further comparison of additive and multiplicative coarse grid correction. Applied numerical mathematics, 65, 53-62.
  7. 19. Napov, A. (2013). Conditioning analysis of incomplete Cholesky factorizations with orthogonal dropping. SIAM journal on matrix analysis and applications, 34(3), 1148–1173.
  8. 20. Napov, A., & Notay, Y. (2012). An algebraic multigrid method with guaranteed convergence rate. SIAM journal on scientific computing, 34(2), A1079-A1109. doi:10.1137/100818509
  9. 21. Napov, A., & Notay, Y. (2011). Algebraic analysis of aggregation-based multigrid. Numerical linear algebra with applications, 18, 539-564. doi:10.1002/nla.741
  10. 22. Napov, A., & Notay, Y. (2011). Smoothing factor, order of prolongation and actual multigrid convergence. Numerische Mathematik, 118(3), 457-483. doi:10.1007/s00211-011-0362-7
  11. 23. Napov, A., & Notay, Y. (2010). When does two-grid optimality carry over to the V-cycle? Numerical linear algebra with applications,(2-3), 273-290. doi:10.1002/nla.685
  12. 24. Napov, A., & Notay, Y. (2010). Comparison of bounds for V-cycle multigrid. Applied numerical mathematics, 60, 176-192. doi:10.1016/j.apnum.2009.11.003
    13. << Précédent 1 2 3 4 5 Suivant >>