杰克对称函数的累积量与$b$-猜想

Maciej Dolkega, Valentin F'eray
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引用次数: 10

摘要

Goulden和Jackson(1996)利用Jack对称函数引入了一些多元生成序列$\psi(x, y, z; t, 1+\beta)$,这些生成序列可以解释为有根超映射生成序列的连续变形。他们做了如下的猜想:$\psi(x, y, z; t, 1+\beta)$在幂和基中的系数是$\beta$中具有非负整数系数的多项式(通过构造,这些系数是$\beta$中的有理函数)。我们通过证明$\psi(x, y, z; t, 1+ \beta)$的系数是$\beta$中具有有理系数的多项式,部分地证明了这个猜想,现在称为$b$ -猜想。证明的一个关键步骤是当千斤顶变形参数$\alpha$趋于$0$时,千斤顶多项式的强分解性质,这可能是独立的兴趣。
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Cumulants of Jack symmetric functions and $b$-conjecture
Goulden and Jackson (1996) introduced, using Jack symmetric functions, some multivariate generating series $\psi(x, y, z; t, 1+\beta)$ that might be interpreted as a continuous deformation of the generating series of rooted hypermaps. They made the following conjecture: the coefficients of $\psi(x, y, z; t, 1+\beta)$ in the power-sum basis are polynomials in $\beta$ with nonnegative integer coefficients (by construction, these coefficients are rational functions in $\beta$). We prove partially this conjecture, nowadays called $b$-conjecture, by showing that coefficients of $\psi(x, y, z; t, 1+ \beta)$ are polynomials in $\beta$ with rational coefficients. A key step of the proof is a strong factorization property of Jack polynomials when the Jack-deformation parameter $\alpha$ tends to $0$, that may be of independent interest.
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期刊介绍: DMTCS is a open access scientic journal that is online since 1998. We are member of the Free Journal Network. Sections of DMTCS Analysis of Algorithms Automata, Logic and Semantics Combinatorics Discrete Algorithms Distributed Computing and Networking Graph Theory.
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