Free Online Productivity Tools
i2Speak
i2Symbol
i2OCR
iTex2Img
iWeb2Print
iWeb2Shot
i2Type
iPdf2Split
iPdf2Merge
i2Bopomofo
i2Arabic
i2Style
i2Image
i2PDF
iLatex2Rtf
Sci2ools
DMCS
2003
2003
A Reciprocity Theorem for Monomer-Dimer Coverings
The problem of counting the number of monomer-dimer coverings of a lattice comes from the field of statistical mechanics. It has only been shown to be exactly solved for the special case of dimer coverings in two dimensions ([2], [9]). In earlier work, Stanley [8] proved a reciprocity principle governing the number N(m, n) of dimer coverings of an m by n rectangular grid (also known as perfect matchings), where m is fixed and n is allowed to vary. As reinterpreted by Propp [5], Stanley’s result concerns the unique way of extending N(m, n) to n < 0 so that the resulting bi-infinite sequence, N(m, n) for n ∈ Z, satisfies a linear recurrence relation with constant coefficients. In particular, Stanley shows that N(m, n) is always an integer satisfying the relation N(m, −2 − n) = m,nN(m, n) where m,n = 1 unless
Real-time TrafficDimer Coverings | DMCS 2003 | Linear Recurrence Relation | Modeling And Simulation | Monomer-dimer Coverings |
| Added | 31 Oct 2010 |
| Updated | 31 Oct 2010 |
| Type | Conference |
| Year | 2003 |
| Where | DMCS |
| Authors | Nick Anzalone, John Baldwin, Ilya Bronshtein, T. Kyle Petersen |
Comments (0)
Researcher Info
|
