Let G be a compact Lie group. We prove that if V and W are orthogonal G-representations such that VG=WG=\0\, then a G-equivariant map S(V) S(W) exists provided that VH ≤ WH for any closed subgroup H⊂eq G. This result is complemented by a reinterpretation in terms of divisibility of certain Euler classes when G is a torus.
