The SCEAS System
Navigation Menu

Search the dblp DataBase

Title:
Author:

James A. Yorke: [Publications] [Author Rank by year] [Co-authors] [Prefers] [Cites] [Cited by]

Publications of Author

  1. Michael Roberts, Wayne Hayes, Brian R. Hunt, Stephen M. Mount, James A. Yorke
    Reducing storage requirements for biological sequence comparison. [Citation Graph (0, 0)][DBLP]
    Bioinformatics, 2004, v:20, n:18, pp:3363-3369 [Journal]
  2. Steven Salzberg, James A. Yorke
    Beware of mis-assembled genomes. [Citation Graph (0, 0)][DBLP]
    Bioinformatics, 2005, v:21, n:24, pp:4320-4321 [Journal]
  3. Ian Frommer, Eric Harder, Brian R. Hunt, Ryan Lance, Edward Ott, James A. Yorke
    Two Models for the Study of Congested Internet Connections [Citation Graph (0, 0)][DBLP]
    CoRR, 2004, v:0, n:, pp:- [Journal]
  4. Stephen M. Hammel, James A. Yorke, Celso Grebogi
    Do numerical orbits of chaotic dynamical processes represent true orbits? [Citation Graph (0, 0)][DBLP]
    J. Complexity, 1987, v:3, n:2, pp:136-145 [Journal]
  5. Michael Roberts, Brian R. Hunt, James A. Yorke, Randall A. Bolanos, Arthur L. Delcher
    A Preprocessor for Shotgun Assembly of Large Genomes. [Citation Graph (0, 0)][DBLP]
    Journal of Computational Biology, 2004, v:11, n:4, pp:734-752 [Journal]
  6. Aaron Strauss, James A. Yorke
    On Asymptotically Autonomous Differential Equations. [Citation Graph (0, 0)][DBLP]
    Mathematical Systems Theory, 1967, v:1, n:2, pp:175-182 [Journal]
  7. James A. Yorke
    Invariance for Ordinary Differential Equations. [Citation Graph (0, 0)][DBLP]
    Mathematical Systems Theory, 1967, v:1, n:4, pp:353-372 [Journal]
  8. James A. Yorke
    Correction: Invariance for Ordinary Differential Equations. [Citation Graph (0, 0)][DBLP]
    Mathematical Systems Theory, 1968, v:2, n:4, pp:381- [Journal]
  9. James A. Yorke
    A Theorem on Liapunov Functions Using V. [Citation Graph (0, 0)][DBLP]
    Mathematical Systems Theory, 1970, v:4, n:1, pp:40-45 [Journal]
  10. James A. Yorke
    Differential Inequalities and Non-Lipschitz Scalar Functions. [Citation Graph (0, 0)][DBLP]
    Mathematical Systems Theory, 1970, v:4, n:2, pp:140-153 [Journal]

  11. Assembly reconciliation. [Citation Graph (, )][DBLP]


  12. Figaro: a novel statistical method for vector sequence removal. [Citation Graph (, )][DBLP]


Search in 0.003secs, Finished in 0.004secs
NOTICE1
System may not be available sometimes or not working properly, since it is still in development with continuous upgrades
NOTICE2
The rankings that are presented on this page should NOT be considered as formal since the citation info is incomplete in DBLP
 
System created by asidirop@csd.auth.gr [http://users.auth.gr/~asidirop/] © 2002
for Data Engineering Laboratory, Department of Informatics, Aristotle University © 2002