Schur Partial Derivative Operators
Abstract
A lattice diagram is a finite list L=((p1,q1),...,(pn,qn) of lattice cells. The corresponding lattice diagram determinant is L(X;Y)= \| xipjyiqj \|. These lattice diagram determinants are crucial in the study of the so-called ``n! conjecture'' of A. Garsia and M. Haiman. The space ML is the space spanned by all partial derivatives of L(X;Y). The ``shift operators'', which are particular partial symmetric derivative operators are very useful in the comprehension of the structure of the ML spaces. We describe here how a Schur function partial derivative operator acts on lattice diagrams with distinct cells in the positive quadrant.
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