The series is an investigation into tiling theory — the mathematical discipline concerned with how a plane can be covered without overlap or gap. Every piece starts from a different rule: the isometric projection of a cube grid, the aperiodic logic of a Penrose P3 lattice, the edge-matching constraint of a Truchet tile, the nearest-neighbour geometry of a Voronoi diagram.
What holds the series together is not palette or style but a shared structural question: when a simple rule is applied without deviation across an infinite plane, what emerges that the rule did not explicitly prescribe? Each piece rewards close attention to a small quadrant — the place where the rule's consequences become visible as something that feels, almost, like intention.
