An idea of out bound reality implies a big bang expansion without probable causes. Luckily, modern cosmologists need not provide any physical or plausible theoretical evidence since all known laws of physics lose their applicability at time zero and 3-space zero. Moreover, the domains of negative time and negative 3-space enter the forbidden region of relativistic light-cones, hence beyond the validated physics of special and general relativity. Although using tensor calculus avoided the reliance of any coordinate system, still tensors never completely satisfied the notion why there can never be a center of universal expansion. The fault lies in the tenacity of believing in a closed surface geometry of either spherical symmetry, cylindrical symmetry, or ellipsoidal symmetry whose topology carries genus zero.

On the other hand, genus infinity implies a topology with infinitely many handles. These handles are simply holes in the topology. For inhabitants living within the topology, these holes can never be detected but appear as the various locations of handles to beings in higher physical dimensions. However, the motions of these holes appear as either physical expansion or contraction depending only on the directions of the holes. The topology is that of a Menger sponge as the 3D analog of a Möbius topology. The 2D analog is a Sierpinski carpet and the 1D analog is a Cantor set. These holes can be described by square symmetric Hadamard matrices representing squares of zero-point energies of the quantum vacuum fluctuations. In the event that these holes collectively move along the lateral surface of the Möbius topology then altogether they simulate an out bound reality of universal expansion. Surprisingly, after one complete cycle, the holes are transformed into anti-holes analogous to real particle becoming its antiparticle. After two complete cycles around the Möbius universe the particle becomes itself once again. Each cycle simulates sequentially an expansion and a contraction.