Add to ORKGIt is shown that two vectors with coordinates in the finite $q$-element field of characteristic $p$ belong to the same orbit under the natural action of the symmetric group if each of the elementary symmetric polynomials of degree $p^k,2p^k,\dots,(q-1)p^k$, $k=0,1,2,\dots$ has the same value on them. This separating set of polynomial invariants for the natural permutation representation of the symmetric group is not far from being minimal when $q=p$ and the dimension is large compared to $p$. A relatively small separating set of multisymmetric polynomials over the field of $q$ elements is derived.Comment: v2: minor edit
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Let G be a linear algebraic group acting linearly on a vector space (or more generally, an affine va...
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Cataloged from PDF version of article.We consider a finite dimensional modular representation V of a...
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Let $G$ be a linear algebraic group acting linearly on a $G$-variety $\mathcal{V}$, and let $k[\math...
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45 pagesLet g be a finite-dimensional simple Lie algebra of rank r over an algebraically closed fiel...
Let G be a linear algebraic group acting linearly on a vector space (or more generally, an affine va...