Annäherung an einen Quasikristall

The idea is perfect, but the representation is imperfect. Do ideas simply lie in higher dimensions? In the exhibition a mosaic with a quasi-crystalline structure in the second dimension represents a crystal in a higher spatial dimension. Quasi-crystals are an example of a translation process between dimensions: from the 1st to the 3rd dimension quasi-crystals have no translational symmetry, their structure is a-periodic. This means that if an infinite quasi-crystal plane is rotated and then overlaid again with the initial plane, these planes will not be congruent. However, this possibility of displacement is characteristic for a crystal. A quasicrystal becomes a crystal in spatial dimensions beyond the third dimension, i.e. periodical, but the framework in which we live only allows us to visually represent the shadow of this object.

Floor Mosaic and video, 2018