论文信息 - Boolean complexes for Ferrers graphs

Boolean complexes for Ferrers graphs

In this paper we provide an explicit formula for calculating the boolean number of a Ferrers graph. By previous work of the last two authors, this determines the homotopy type of the boolean complex of the graph. Specializing to staircase shapes, we show that the boolean numbers of the associated Ferrers graphs are the Genocchi numbers of the second kind, and obtain a relation between the Legendre-Stirling numbers and the Genocchi numbers of the second kind. In another application, we compute the boolean number of a complete bipartite graph, corresponding to a rectangular Ferrers shape, which is expressed in terms of the Stirling numbers of the second kind. Finally, we analyze the complexity of calculating the boolean number of a Ferrers graph using these results and show that it is a significant improvement over calculating by edge recursion.

Sergey Kitaev | Bridget Eileen Tenner | Anders Claesson | Kári Ragnarsson

[1] Christian Hoffmann,et al. A Most General Edge Elimination Polynomial - Thickening of Edges , 2008, Fundam. Informaticae.

[2] Uwe Nagel,et al. Monomial and toric ideals associated to Ferrers graphs , 2006, math/0609371.

[3] N. J. A. Sloane,et al. The On-Line Encyclopedia of Integer Sequences , 2003, Electron. J. Comb..

[4] Peter Tittmann,et al. A new two-variable generalization of the chromatic polynomial , 2003, Discret. Math. Theor. Comput. Sci..

[5] Richard Ehrenborg,et al. Yet Another Triangle for the Genocchi Numbers , 2000, Eur. J. Comb..

[6] Kári Ragnarsson,et al. Homotopy type of the boolean complex of a Coxeter system , 2008, 0806.0906.

[7] Lance L. Littlejohn,et al. Legendre polynomials, Legendre--Stirling numbers, and the left-definite spectral analysis of the Legendre differential expression , 2002 .

[8] Richard Ehrenborg,et al. Enumerative Properties of Ferrers Graphs , 2004, Discret. Comput. Geom..

[9] Lance L. Littlejohn,et al. A General Left-Definite Theory for Certain Self-Adjoint Operators with Applications to Differential Equations , 2002 .

[10] Johann A. Makowsky,et al. An extension of the bivariate chromatic polynomial , 2010, Eur. J. Comb..