# How to place a two-dimensional contour map under a three-dimensional ascending contour map? [duplicate]

I want to place a two-dimensional contour map under a three-dimensional ascending contour map。I use “Texture” function wihch can not work against。 I want to like this picutre：

 g[x_, y_, z_] :=
If[x == 0 && y == 0 && z == 0, None,
Exp[-0.3 Sqrt[x^2 + y^2 + z^2]] x];
{ContourPlot3D[#, {x, -10, 10}, {y, -10, 10}, {z, -10, 10}],
buttom =
SliceContourPlot3D[#, {"CenterPlanes"}, {x, -15, 15}, {y, -15,
15}, {z, -15, 15}, Boxed -> False, Axes -> False,
ViewPoint -> Front]} & /@ {g[x, y, z]^2}
ContourPlot3D[g[x, y, z], {x, -10, 10}, {y, -10, 10}, {z, -10, 10},
PlotStyle -> Texture[buttom]]


How should I can do？

• Commented Jul 25, 2019 at 7:37
• yes.it is my want to. Commented Jul 25, 2019 at 13:19
• yes.By reading this ,I have solve my problem Commented Jul 25, 2019 at 13:37

pretty good

g[x_, y_, z_] :=
If[x == 0 && y == 0 && z == 0, None,
Exp[-0.2 Sqrt[x^2 + y^2 + z^2]] x]
atomplot1 =
ContourPlot3D[
g[x, y, z]^2, {x, -15, 15}, {y, -15, 15}, {z, -15, 15},
ColorFunction -> Function[{x, y, z}, Hue[g[x, y, z]]]];
atomplot2 =
atomplot2 =
SliceContourPlot3D[g[x, y, z + 15]^2,
z == -15, {x, -15, 15}, {y, -15, 15}, {z, -15, 15}, Axes -> False,
ColorFunction -> "Rainbow"];
Show[atomplot1, atomplot2, PlotRange -> All, BoxRatios -> {1, 1, .6}, FaceGrids -> {Back, Left}]