比利时vs摩洛哥足彩
,
university of california san diego
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math 269 - combinatorics
jim haglund
university of pennsylvania
a polynomial identity for the hilbert series of diagonal harmonics
abstract:
a special case of haiman's identity for the character of the quotient ring of diagonal coinvariants under the diagonal action of the symmetric group yields a formula for the bigraded hilbert series as a sum of rational functions in $q,t$. in this talk i will show how a summation identity of garsia and zabrocki for macdonald polynomial pieri coefficients can be used to transform haiman's formula for the hilbert series into an explicit polynomial in $q,t$ with integer coefficients. an equivalent formulation expresses the hilbert series as the constant term in a certain multivariate laurent series.
host: jeff remmel
may 25, 2010
4:00 pm
ap&m 7321
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