Weyl's_tile_argument
Weyl's tile argument
Philosophical argument
In philosophy, Weyl's tile argument, introduced by Hermann Weyl in 1949, is an argument against the notion that physical space is "discrete", as if composed of a number of finite sized units or tiles.[1] The argument purports to show a distance function approximating Pythagoras' theorem on a discrete space cannot be defined and, since the Pythagorean theorem has been confirmed to be approximately true in nature, physical space is not discrete.[2][3][4] Academic debate on the topic continues, with counterarguments proposed in the literature.[5][6][7]