Using an analogue of the Robinson-Schensted-Knuth (RSK) algorithm for semi-skyline augmented fillings, due to Sarah Mason, we exhibit expansions of non-symmetric Cauchy kernels ∏(i,j)∈η(1−x_i y_j)−1, where the product is over all cell-coordinates (i,j) of the stair-type partition shape η, consisting of the cells in a NW-SE diagonal of a rectangle diagram and below it, containing the biggest stair shape. In the spirit of the classical Cauchy kernel expansion for rectangle shapes, this RSK variation provides an interpretation of the kernel for stair-type shapes as a family of pairs of semi-skyline augmented fillings whose key tableaux, determined by their shapes, lead to expansions as a sum of products of two families of key polynomials, the basis of Demazure characters of type A, and the Demazure atoms. A previous expansion of the Cauchy kernel in type A, for the stair shape was given by Alain Lascoux, based on the structure of double crystal graphs, and by Amy M. Fu and Alain Lascoux, relying on Demazure operators, which was also used to recover expansions for Ferrers shapes.
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机译:使用罗宾逊-舒恩斯德-克努斯(Robinson-Schensted-Knuth)(RSK)算法的类似物进行半天际线填充,由于萨拉·梅森(Sarah Mason),我们展示了非对称柯西内核∏(i,j)∈η(1-x_i y_j)-的展开在图1中,乘积位于阶梯型分隔形状η的所有像元坐标(i,j)上,由矩形图的NW-SE对角线及其下方的像元组成,包含最大的阶梯形状。秉承经典的柯西矩形展开式内核的精神,此RSK变体将楼梯型形状的内核解释为一对半天际线增强填充物,其关键形状取决于其形状,从而导致扩展是两个关键多项式族的乘积之和,A型Demazure字符的基础和Demazure原子。 Alain Lascoux根据双晶图的结构,对楼梯形状进行了A型Cauchy核的先前扩展,Amy M. Fu和Alain Lascoux依靠Demazure算子对这种形状进行了扩展,后者也用于恢复Ferrers形状的展开。
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