Powers of binary forms and derived Hermite reciprocity

Abstract

For a,b 1, Hilbert found in 1886 a collection of polynomial equations that cut out set-theoretically the variety X parametrizing a-th powers of binary forms of degree b. We determine the ideal of all polynomials vanishing on X, showing that it is generated in degree b+1 and that it has a linear minimal free resolution. We do this by generalizing results of Abdesselam and Chipalkatti on an analogue of the Foulkes--Howe map and by establishing a derived analogue of the classical Hermite reciprocity theorem for complexes of SL2-representations. In our investigation, we are led to the ideal generated by the subrepresentation Symab( C2) ⊂ Syma( Symb C2). We determine its Castelnuovo--Mumford regularity in general and the minimal free resolution for small values of b.