Follow
James Currie
Title
Cited by
Cited by
Year
The metric dimension and metric independence of a graph
J Currie, OR Oellerman
The Charles Babbage Research Centre, 2001
1062001
A proof of Dejean’s conjecture
J Currie, N Rampersad
Mathematics of computation 80 (274), 1063-1070, 2011
982011
There are ternary circular square-free words of length n for n≥ 18
JD Currie
The Electronic Journal of Combinatorics, 2002
932002
Pattern avoidance: themes and variations
JD Currie
Theoretical Computer Science 339 (1), 7-18, 2005
792005
Open problems in pattern avoidance
J Currie
The American mathematical monthly 100 (8), 790-793, 1993
781993
Dejean’s conjecture and Sturmian words
M Mohammad-Noori, JD Currie
European Journal of Combinatorics 28 (3), 876-890, 2007
672007
Avoiding three consecutive blocks of the same size and same sum
J Cassaigne, JD Currie, L Schaeffer, J Shallit
Journal of the ACM (JACM) 61 (2), 1-17, 2014
432014
Extremal infinite overlap-free binary words
JP Allouche, J Currie, J Shallit
the electronic journal of combinatorics, R27-R27, 1998
411998
Least periods of factors of infinite words
JD Currie, K Saari
RAIRO-Theoretical Informatics and Applications 43 (1), 165-178, 2009
402009
Dejean's conjecture holds for n≥ 27
J Currie, N Rampersad
RAIRO-Theoretical Informatics and Applications 43 (4), 775-778, 2009
342009
Non-repetitive tilings
JD Currie, J Simpson
the electronic journal of combinatorics, R28-R28, 2002
282002
The number of ternary words avoiding abelian cubes grows exponentially.
A Aberkane, JD Currie, N Rampersad
Journal of Integer Sequences [electronic only] 7 (2), currie18. pdf, 2004
252004
Circular words avoiding patterns
JD Currie, DS Fitzpatrick
Developments in Language Theory: 6th International Conference, DLT 2002 …, 2003
242003
Avoiding patterns in the abelian sense
J Currie, V Linek
Canadian Journal of Mathematics 53 (4), 696-714, 2001
242001
A cyclic binary morphism avoiding abelian fourth powers
JD Currie, A Aberkane
Theoretical Computer Science 410 (1), 44-52, 2009
232009
Abelian Complexity of Fixed Point of Morphism 0 ↦ 012, 1 ↦ 02, 2 ↦ 11
F Blanchet-Sadri, JD Currie, N Rampersad, N Fox
INTEGERS 14, A11, 2014
222014
The number of binary words avoiding abelian fourth powers grows exponentially
JD Currie
Theoretical computer science 319 (1-3), 441-446, 2004
222004
Long binary patterns are Abelian 2-avoidable
JD Currie, TI Visentin
Theoretical Computer Science 409 (3), 432-437, 2008
212008
On the structure and extendibility of k-power free words
JD Currie
European Journal of Combinatorics 16 (2), 111-124, 1995
211995
The number of order–preserving maps of fences and crowns
J Currie, TI Visentin
Springer, 1991
211991
The system can't perform the operation now. Try again later.
Articles 1–20