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Correlations for the Novak process
2012
Discrete Mathematics & Theoretical Computer Science
International audience We study random lozenge tilings of a certain shape in the plane called the Novak half-hexagon, and compute the correlation functions for this process. This model was introduced by Nordenstam and Young (2011) and has many intriguing similarities with a more well-studied model, domino tilings of the Aztec diamond. The most difficult step in the present paper is to compute the inverse of the matrix whose (i,j)-entry is the binomial coefficient $C(A, B_j-i)$ for indeterminate
doi:10.46298/dmtcs.3070
fatcat:zpldz75w5vatnhsvtuthb7et3i