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4 votes

Isotypic components of the action of the symmetric group on polynomials

The answer depends on the structure that you want on the collection of generators you are looking for. If you really want just generators of $\mathbb{C}[x_1,\ldots,x_n]$ over $\mathbb{C}[x_1,\ldots,x_ …
Vladimir Dotsenko's user avatar
4 votes
Accepted

A nice generating set for the symmetric power of an algebra

Since your algebra is finitely generated, you only really need this result in the case when $A=\mathbb{C}[t_1,\ldots,t_n]$. It seems that this result first appeared in F. Junker, Über symmetrische …
Vladimir Dotsenko's user avatar
7 votes
Accepted

Generalizing the Fundamental Theorem of Symmetric Polynomials

I heard of three relatively recent works in that direction, taking different routes and arriving to interesting information about diagonal invariants. First, there is the paper of Vaccarino that Dar …
Vladimir Dotsenko's user avatar
3 votes
Accepted

Alternating elements in free graded-commutative algebras

If you assume $\ell>n$, then you may as well work over the field $F=\mathbb{Q}$, since the representation theory is exactly the same (the group algebra is semisimple, all Young symmetrisers in the gro …
Vladimir Dotsenko's user avatar
7 votes

Applying $\sum_i \partial_{x_i}$, $\sum_i x_i \partial_{x_i}$ and $\sum_i x_i^2 \partial_{x_...

The answer for $L_1=\sum_ix_i^2\partial_i$ can be derived in a rather straightforward way (I changed your convention a little bit to match the usual formulas for Virasoro algebra). Namely, use the det …
Vladimir Dotsenko's user avatar