A Generalized Vandermonde Determinant
Marshall W. Buck
, Raymond A. Coley
and David P. Robbins
DOI: 10.1023/A:1022468019197
Abstract
We prove two determinantal identities that generalize the Vandermondedeterminant identity det( x i j ) i, j = 0, \frac{1}{4} , m = Õ 0 \leqslant i < j \leqslant m ( x j - x i ) \det (x_i^j )_{i,j = 0, \ldots ,m} = \prod\limits_{0 \leqslant i < j \leqslant m} {(x_j - x_i )} . In the first of our identities the set {0, ..., m} indexing the rows and columns of thedeterminant is replaced by an arbitrary finite order ideal in the set ofsequences of nonnegative integers which are 0 except for a finite numberof components. In the second the index set is replaced by an arbitraryfinite order ideal in the set of all partitions.
Pages: 105–109
Keywords: Vandermonde; determinant; partition; ideal
Full Text: PDF
References
1. E.A. Bender, R.A. Coley, D.P. Robbins, and H. Rumsey, Jr., "Enumeration of subspaces by dimension sequence,"
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