Using a mathematical model for self-foldability of rigid origami, we determine which monohedral quadrilateral tilings of the plane are uniquely self-foldable. In particular, the Miura-ori and Chicken Wire patterns are not self-foldable under our defi
nition, but such tilings that are rotationally-symmetric about the midpoints of the tile are uniquely self-foldable.
In this paper, we will show methods to interpret some rigid origami with higher degree vertices as the limit case of structures with degree-4 supplementary angle vertices. The interpretation is based on separating each crease into two parallel crease
s, or emph{double lines}, connected by additional structures at the vertex. We show that double-lin
