In the euclidean space, the points ( x , y , z ) belonging to a regular octa

This is indeed a tesseract. Look at them inequalities: they define eight hyperplanes, which split in four pairs of parallel hyperplanes, which in turn are all perpendicular to each other.
This is a part of a broader picture, which has many things in common with the 3D case and many things different from it.
Let's look closer. Here is the 3D case:
1. By throwing away half of the vertices of a 3D cube, we get a demicube which happens to be a tetrahedron.
2. No faces of the cube survive; the faces of the tetrahedron are located in different planes.
3. This can be done in two ways. By doing both, we get two tetrahedra. Their union is the Kepler's stella octangula, their convex hull is the original cube, and their intersection is an octahedron.
4. The symmetry of the tetrahedron is a subset (subgroup) of that of the cube.
5. By looking at a tetrahedron, we may reconstruct the unique original cube of which it is a demicube.
Now the 4D case:
1. By throwing away half of the vertices of a tesseract (4D cube), we get a demitesseract which happens to be an orthoplex (cross-polytope).
2. The hyperfaces (cells) of the hypercube are not lost entirely, but "trimmed" to form some of those of the new figure.
3. The procedure can be done in two ways, leading to two different orthoplexes.
4. The symmetry group of the orthoplex is the same as that of the tesseract (they aren's called duals for nothing, after all), but when positioned like this, only a part of their symmetry elements is common to both.
5. By looking at an orthoplex, we may reconstruct the original tesseract using your procedure or otherwise, but it can be done in two ways.
6. By applying both procedures repeatedly, we arrive at the following magnificent construction. Imagine three sets of 8 vertices each, say:
$$\begin{gathered} (\pm <!--\; \pm \; -->1,\pm <!--\; \pm \; -->1,\pm <!--\; \pm \; -->1,\pm <!--\; \pm \; -->1)\text{ with odd number of -1's} \\ (\pm <!--\; \pm \; -->1,\pm <!--\; \pm \; -->1,\pm <!--\; \pm \; -->1,\pm <!--\; \pm \; -->1)\text{ with even number of -1's} \\ (\pm <!--\; \pm \; -->2,0,0,0)\text{ and the permutations} \end{gathered}$$
Each set defines an orthoplex. Each two sets together define a tesseract. Each tesseract has two inscribed orthoplexes, and each orthoplex is inscribed in two tesseracts. The convex hull of everything is a 24-cell. The intersection of everything is a smaller 24-cell, sitting in dual orientation to the first one.
So it goes.