Macaulay representation of an integer
Given positive integers and , the -th Macaulay representation of is an expression for as a sum of binomial coefficients:
Here, is a uniquely determined, strictly increasing sequence of nonnegative integers known as the Macaulay coefficients. For any two positive integers and , if and only if the sequence of Macaulay coefficients for comes before the sequence of Macaulay coefficients for in lexicographic order.
References
- Huneke, Craig; Swanson, Irena (2006), "Appendix 5", Integral closure of ideals, rings, and modules, London Mathematical Society Lecture Note Series, 336, Cambridge, UK: Cambridge University Press, ISBN 978-0-521-68860-4, MR 2266432
- Caviglia, Giulio (2005), "A theorem of Eakin and Sathaye and Green's hyperplane restriction theorem", Commutative Algebra: Geometric, Homological, Combinatorial and Computational Aspects, CRC Press, ISBN 978-1-420-02832-4
- Green, Mark (1989), "Restrictions of linear series to hyperplanes, and some results of Macaulay and Gotzmann", Algebraic Curves and Projective Geometry, Lecture Notes in Mathematics, Springer, doi:10.1007/BFb0085925, ISBN 978-3-540-48188-1
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