\begin{thebibliography}{99} %\item[]\vspace{-10mm}\hspace{24mm}\vspace{3mm} \bibitem{Aign} M. Aigner, {\it Diskrete Mathematik,} Vieweg, Braunschweig, 1993. \bibitem{refl} D. Andr\'{e}, {\rm Calcul des probabilit\'es. Solution directe du probl\`eme r\'esolu par M. Bertrand,} {\it C. R. Math. Acad. Sci. Paris,} Vol {\bf 105} (1887) 436. \label{_refl} \bibitem{why} C. Banderier and S. R. Schwer, {\rm Why Delannoy numbers?} {\it J. Statist. Plann. Inference} {\bf 135} (2005), 40--54, CoRR math.CO/0411128: (2004) \label{_why} \bibitem{class} J. Bertrand, {\rm Calcul des probabilit\'es. Solution d'un probl\`eme,} {\it C. R. Math. Acad. Sci. Paris,} Vol {\bf 105} (1887) 369. \label{_class} \bibitem{Biz} M. T. L. Bizley, {\rm Derivation of a new formula for the number of minimal lattice paths from ${(0,0)}$ to ${(k m, k n)}$ having just $t$ contacts with the line ${m y = n x}$ and having no points above this line; and a proof of Grossman's formula for the number of paths which may touch but do not rise above this line,} {\it J. Inst. Actuaries} {\bf 80} (1954) 55--62.\label{_Biz} \bibitem{ConSlo} J. H. Conway and N. J. A. Sloane, \newline {\rm citeseer.ist.psu.edu/article/conway96lowdimensional.html} ({\rm Low Dimensional Lattices VII: Coordination Sequences,} {\it Proc. R. Soc. Lond. Ser. A Math. Phys. Eng. Sci.} {\bf 453} (1997), 2369--2389.) \label{_ConSlo} \bibitem{dela} H. Delannoy, {\rm Emploi de l'\'echiquier pour la r\'esolution de certains probl\`emes de probabilit\'es,} {\it Association Francaise pour l'Avancement des Sciences}, Bordeaux XXIV (1895) 70--90. \label{_dela} \bibitem{problem} E. Deutsch, {\rm Problem 10658,} {\it Amer. Math. Monthly} {\bf 105} (1998), 366. \label{_problem} \bibitem{solution} {\rm Solution to Problem 10658,} {\it Amer. Math. Monthly} {\bf 107} (2000), 368--371. \label{_solution} \bibitem{DvoMotz} A. Dvoretzky and Th. Motzkin, {\rm A problem of arrangements,} {\it Duke Math. J.} {\bf 14} (1947) 305--313.\label{_DvoMotz} \bibitem{GV} I. Gessel and G. Viennot, {\rm Binomial determinants, paths, and hook length formulae,} {\it Adv. Math.} {\bf 58} (1985) 300--321. \label{_GV} \bibitem{GoodNara} E. Goodman T. V. Narayana, {\rm Lattice paths with diagonal steps,} {\it Canad. Math. Bull.} {\bf 12} (1969) 847--855. \label{_GoodNara} \bibitem{GouSer} I. P. Goulden and L. G. Serrano, {\rm Maintaining the spirit of the reflection principle when the boundary has arbitrary integer slope,} {\it J. Combin. Theory Ser. A} {\bf 104} (2003), 317--326. \label{_GouSer} \bibitem{HB} {\it Handbook of Discrete and Combinatorial Mathematics,} Eds. K H Rosen et al., CRC Press, Boca Raton etc. 2000. \label{_HB} \bibitem{Hetyei} G. Hetyei, {\rm Central Delannoy numbers and balanced Cohen-Macaulay complexes,} {\it Ann. Comb.} {\bf 10} (2006), 443--462. \label{_Hetyei} \bibitem{Kratten} C. Krattenthaler, {\rm The enumeration of lattice paths with respect to their number of turns,} in Advances in Combinatorial Methods and Applications to Probability and Statistics, N. Balakrishnan, Ed., Birkh\"auser, Boston (1997) 29--58. \label{_Kratten} \bibitem{KrattSul} C. Krattenthaler and R A Sulanke, {\rm Counting pairs of non-intersecting lattice paths with respect to weighted turns,} {\it Discrete Math.} {\bf 153} (1996), 189--198. \label{_KrattSul} \bibitem{Krew1} G. Kreweras, {\rm Sur une classe de probl\`emes de d\'enombrement li\'es au treillis des partitions de entiers,} Thesis, Universit\'{e} Paris, 1965 \label{_Krew1} \bibitem{Lawden} D. F. Lawden, {\rm On the solution of linear difference equations,} {\it Math. Gaz.} {\bf 36} (1952) 193--196.\label{_Lawden} \bibitem{Mohanty} S. G. Mohanty, {\it Lattice Path Counting and Applications,} Academic Press, New York, 1979. \label{_Mohanty} \bibitem{Moser} L. Moser, {\rm King paths on a chessboard,} {\it Math. Gaz.} {\bf 39} (1955) 54.\label{_Moser} \bibitem{aPS} E. Pergola and R. A. Sulanke, {\rm Schr\"oder triangles, paths, and parallelogram polyominoes,} {\it J. Integer Seq.} {\bf 1} (1998), 1 -- 26, Article 98.1.7.\label{_aPS} \bibitem{Ran} G. N. Raney, {\rm Functional composition patterns and power series reversion,} {\it Trans. Amer. Math. Soc.} {\bf 94} (1960) 441--451.\label{_Ran} \bibitem{Rogers2} D. G. Rogers, {\rm A Schr\"oder triangle,} in Combinatorial Mathematics V: Proceedings of the Fifth Australian Conference. {\it Lecture Notes in Mathematics} {\bf 622}, Springer-Verlag, Berlin, 1977, 175--196. \label{_Rogers2} \bibitem{Rogers1} D. G. Rogers, {\rm Pascal triangles, Catalan numbers and renewal arrays,} {\it Discrete Math.} {\bf 22} (1978) 301--310. \label{_Rogers1} \bibitem{RS} D. G. Rogers and L. W. Shapiro, {\rm Some correspondences involving the Schr\"oder numbers and relations,} in Comb. Math., Proc. of the intern. Conf., Canberra 1977, {\it Lecture Notes in Mathematis} {\bf 686}, Springer Verlag, Berlin, 1978, 267--276. \label{_RS} \bibitem{schr} E. Schr\"oder, {\rm Vier combinatorische Probleme,} {\it Z. Math. Phys.} {\bf 15} (1870) 361--376. \label{_schr} \bibitem{fill} J. Schr\"oder, {\rm Filling boxes densely and disjointly,} {\it Comment. Math. Univ. Carolin.} {\bf 44} (2003), 187--196. \bibitem{online} N. J. A. Sloane and Mathematical Community, {\rm The On-Line Encyclopedia of Integer Sequences,} \label{online} www.research.att.com/$\sim$njas/sequences/ \bibitem{Stan1} R. P. Stanley, {\rm Hipparchus, Plutarch, Schr\"oder and Hough,} {\it Amer. Math. Monthly} {\bf 104} (1997), 344--350. \label{_Stan1} \bibitem{Stan2} R. P. Stanley, {\it Enumerative Combinatorics,} Vol. 2. Cambridge University Press, Cambridge, 1999. \label{_Stan2} \bibitem{Sulanke3} R. A. Sulanke, {\rm A recurrence restricted by a diagonal condition: generalized Catalan arrays,} {\it Fibonacci Quart.} {\bf 27} (1989) 33--46. \label{_Sulanke3} \bibitem{Sulanke2} R. A. Sulanke, {\rm Problem 10894,} {\it Amer. Math. Monthly} {\bf 108} (2001), 770. \label{_Sulanke2} \bibitem{Sulanke} R. A. Sulanke, {\rm Objects counted by the central Delannoy Numbers,} {\it J. Integer Seq.} {\bf 6} (2003), 1--19, Article 03.1.5. \label{_Sulanke} \bibitem{vass} M. Vassilev and K. Atanassov, {\rm On Delanoy [!] numbers,} {\it Annuaire Univ. So.a Fac. Math. Inform.} {\bf 81} (1994), 153--162. \label{_vass} \bibitem{wilf} H. S. Wilf, {\it Generatingfunctionology,} Academic Press, New York, 1994. \label{_wilf} %\end{enumerate} \end{thebibliography}