Complete homogeneous symmetric polynomials with repeating variables
Abstract
We consider polynomials of the form hm(y1[1],…,yn[n]), where hm is the complete homogeneous polynomial of degree m and yj[j] denotes yj repeated j times. Using the decomposition of the generating function into partial fractions we represent such polynomials in the form \[ hm(y1[1],…,yn[n]) =Σj=1n Σr=1j r+m-1r-1 Ay,,j,r yjm, \] where Ay,,j,r are some coefficients that do not depend on m. We also provide an alternative proof using the inverse of the confluent Vandermonde matrix.
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