This question is related to this one. If I have an locally closed, quasi projective scheme $X$ contained in an affine space, and a linearly reductive group acting freely on $X$, are there examples where the dimension dim X - dim G is not realized by any of its irreducible components?

This question is related to this one. If I have an locally closed, quasi projective scheme $X$ contained in an affine space, and a linearly reductive group $G$ acting freely on $X$, are there examples where the dimension $\dim X - \dim G$ is not realized by any of its irreducible components?