Cauchy identity, with sum restricted over partitions with first part $\leq n$

Question

The Cauchy Identity $$ \sum_{\nu}s_{\nu}(x)s_{\nu}(y) = \prod_{j,k=1}^{\infty}\frac{1}{1-x_{j}y_{k}} $$ expresses the sum over all integer partitions of the product of pairs of Schur polynomials as the double product in the right hand side above. Since Schur polynomials verify $$ s_{\nu}(x_{1},...,x_{n})=0 $$ if $l(\nu)>n$, specializing all but $n$ variables from each set in the Cauchy identity to zero we obtain $$ \sum_{l(\nu)\leq n}s_{\nu}(x_{1},...,x_{n})s_{\nu}(y_{1},...,y_{n}) = \prod_{j,k=1}^{n}\frac{1}{1-x_{j}y_{k}}. $$ Note that the sum is now restricted to partitions of length not greater than $n$.

My question is the following: is there a simple way to express the sum $$ \sum_{\nu_{1}\leq n}s_{\nu}(x)s_{\nu}(y), $$ where the sum is now restricted to partitions with first part less than or equal to $n$? (possibly specializing variables, as above).

Answer 1

The sum (in any number of variables) is equal to the determinant $$\det(B_{j-i})_{1\le i,j\le n},$$ where $$B_i=\sum_{l=0}^\infty e_{l+i}(x)e_l(y),$$ and $e_l$ is the elementary symmetric function, with $e_l=0$ for $l<0$. This follows by applying the involution $\omega$ in $x$ and $y$ to Theorem 16 of my paper Symmetric functions and P-recursiveness, Journal of Combinatorial Theory, Series A 53 (1990), 257–285. The theorem follows fairly easily from the Cauchy-Binet formula and the Jacobi-Trudi formula.