The tilings of deficient squares by ribbon L-tetrominoes are diagonally cracked

Abstract

We consider tilings of deficient rectangles by the set T4 of ribbon L-tetrominoes. A tiling exists iff the rectangle is a square of odd side. The missing cell is on the main NW--SE diagonal, in an odd position if the square is (4m+1)× (4m+1) and in an even position for (4m+3)× (4m+3). The majority of the tiles in a tiling are paired and each pair tiles a 2× 4 rectangle. The tiles in an irregular position and the missing cell form a NW--SE diagonal crack, located in a thin region symmetric about the diagonal, made out of 3× 3 squares that overlap over one of the corner cells. The crack divides the square in two equal area parts. The number of tilings of a (4m+1)× (4m+1) deficient square is equal to the number of tilings by dominoes of a 2m× 2m square. The number of tilings of a (4m+3)× (4m+3) deficient square is twice the number of tilings by dominoes of a (2m+1)× (2m+1) deficient square, with missing cell placed on the main diagonal. If an extra 2× 2 tile is added to T4, we call the new tile set T4+. A tiling of a deficient rectangle by T4+ exists iff the rectangle is a square of odd side. The missing cell is on the main NW--SE diagonal, in an odd position if the square is (4m+1)× (4m+1) and in an even position for (4m+3)× (4m+3). The majority of the tiles in a tiling are either paired tetrominoes and each pair tiles a 2× 4 rectangle, or are 2× 2 squares. The tiles in an irregular position and the missing cell form a NW--SE diagonal crack, located in a thin region symmetric about the diagonal, made out of 3× 3 squares that overlap over one of the corner cells.