More Web Proxy on the site http://driver.im/
Jacobsthal Decompositions of Pascal’s Triangle, Ternary Trees, and Alternating Sign Matrices
Paul Barry
School of Science
Waterford Institute of Technology
Ireland
Abstract:
We examine Jacobsthal decompositions of Pascal's triangle and Pascal's
square from a number of points of view, making use of bivariate
generating functions, which we derive from a truncation of the
continued fraction generating function of the Narayana number triangle.
We establish links with Riordan array embedding structures. We explore
determinantal links to the counting of alternating sign matrices and
plane partitions and sequences related to ternary trees. Finally, we
examine further relationships between bivariate generating functions,
Riordan arrays, and interesting number squares and triangles.
Full version: pdf,
dvi,
ps,
latex
(Concerned with sequences
A000045
A000108
A001006
A001045
A001263
A001850
A002426
A004148
A005130
A005156
A005161
A006013
A006134
A006318
A007318
A023431
A025247
A025250
A025265
A026374
A047749
A050512
A051049
A051159
A051255
A051286
A053088
A056241
A059332
A059475
A059477
A059489
A078008
A080635
A091561
A092392
A094639
A100100
A109972
A110320
A120580
A152225
A159965
A167892
A169623
A173102
A187306
A238112.)
Received July 15 2014; revised version received February 24 2016.
Published in Journal of Integer Sequences, April 6 2016.
Return to
Journal of Integer Sequences home page