On the semistability of binary forms over number fields

Abstract

Let K be a number field, OK its ring of integers, and f(x, y) ∈ OK[x, y] a binary form with integer coefficents. For any given prime p ∈ OK we determine explicitly a binary form g (resp. f), GL2 (K)-equivalent to f which is semistable over the local field Kp (resp. the global field K). Moreover, if (f) is the corresponding moduli point in the weighted projective space WP wn (K) for a strictly semistable binary form f, we determine the weighted moduli height h ((f)) for d=4, 6, 8, 10.