paritetuille

Paritetuille is a hypothetical tiling concept in combinatorics and tiling theory. It denotes a tiling of a rectangular region by unit square tiles in which each tile carries a binary parity label, 0 or 1, and the labels satisfy a local parity constraint: the sum of the labels in every 2x2 block is even (mod 2). The term blends parity and tile and is used to study parity-driven structure in tilings.

Formally, for an m-by-n grid, a paritetuille is an assignment b_{i,j} ∈ {0,1} to each cell such that

Variants may replace 2x2 blocks with k×k blocks, use different lattices (triangular, hexagonal), or permit additional

Examples and applications: on a 2x2 region, there are 2^{3}=8 labelings; on a 3x4 region, 2^{6}=64. Paritetuille

See also: tiling theory, parity, domino tilings, GF(2) linear systems.