Stanley C Eisenstat
Affiliations: | Computer Science | Yale University, New Haven, CT |
Website:
https://cpsc.yale.edu/people/stanley-eisenstatGoogle:
"Stanley Charles Eisenstat" OR "Stanley C Eisenstat"Bio:
https://books.google.com/books?id=u8FEAQAAIAAJ
http://www.cs.yale.edu/publications/techreports/tr12.pdf
Parents
Sign in to add mentorCleve Barry Moler | grad student | 1972 | Stanford | |
(On the Rate of Convergence of the Bergman-Vekua Method for the Numerical Solution of Elliptic Boundary Value Problems) |
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Publications
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Eisenstat SC, Gratton S, Titley-Peloquin D. (2017) On the Symmetric Componentwise Relative Backward Error for Linear Systems of Equations Siam Journal On Matrix Analysis and Applications. 38: 1100-1115 |
Eisenstat SC, Liu JWH. (2007) Algorithmic aspects of elimination trees for sparse unsymmetric matrices Siam Journal On Matrix Analysis and Applications. 29: 1363-1381 |
Eisenstat SC. (2006) A perturbation bound for the eigenvalues of a singular diagonalizable matrix Linear Algebra and Its Applications. 416: 742-744 |
Eisenstat SC, Liu JWH. (2005) The theory of elimination trees for sparse unsymmetric matrices Siam Journal On Matrix Analysis and Applications. 26: 686-705 |
Eisenstat SC, Liu JWH. (2005) A tree-based dataflow model for the unsymmetric multifrontal method Electronic Transactions On Numerical Analysis. 21: 1-19 |
Demmel JW, Eisenstat SC, Gilbert JR, et al. (1999) A supernodal approach to sparse partial pivoting Siam Journal On Matrix Analysis and Applications. 20: 720-755 |
Demmel J, Gu M, Eisenstat S, et al. (1999) Computing the singular value decomposition with high relative accuracy Linear Algebra and Its Applications. 299: 21-80 |
Demmel J, Gu M, Eisenstat S, et al. (1999) Computing the singular value decomposition with high relative accuracy Linear Algebra and Its Applications. 299: 21-80 |
Eisenstat SC, Ipsen ICF. (1998) Three absolute perturbation bounds for matrix eigenvalues imply relative bounds Siam Journal On Matrix Analysis and Applications. 20: 149-158 |
Rothberg E, Eisenstat SC. (1998) Node selection strategies for bottom-up sparse matrix ordering Siam Journal On Matrix Analysis and Applications. 19: 682-695 |