Add to ORKGIn this paper we study the hierarchical structure of the 2-d polyominoes. We introduce a new infinite family of polyominoes which we prove tiles a strip. We discuss applications of algebra to tiling. We discuss the algorithmic decidability of tiling the infinite plane Z x Z given a finite set of polyominoes. We will then discuss tiling with rectangles. We will then get some new, and some analogous results concerning the possible hierarchical structure for the 3-d polycubes
AbstractIt has been proved that, among the polyominoes that tile the plane by translation, the so-ca...
AbstractGolomb (J. Combin. Theory 1 (1966) 280–296) showed that any polyomino which tiles a rectangl...
A permutomino is a polyomino uniquely determined by a pair of permutations. Recently permutominoes, ...
AbstractThe definitions and lattice hierarchy previously established for tiling regions with individ...
AbstractThe definitions and lattice hierarchy previously established for tiling regions with individ...
AbstractGolomb has covered the main previous results of tiling a rectangle with congruent polyominoe...
It has been proved that, among the polyominoes that tile the plane by translation, the so-called squ...
AbstractIt has been proved that, among the polyominoes that tile the plane by translation, the so-ca...
For finite polyomino regions, tileability by a pair of rectangles is NP-complete for all but trivial...
We present a new mathematical model for tiling finite subsets of $\mathbb{Z}^2$ using an arbitrary, ...
The thesis represents a collection of solved problems concerned with covering planar shapes (mostly ...
We present a new type of polyominoes that can have transparent squares (holes). We show how these po...
AbstractGolomb has covered the main previous results of tiling a rectangle with congruent polyominoe...
AbstractOn square or hexagonal lattices, tiles or polyominoes are coded by words. The polyominoes th...
Beauquier and Nivat introduced and gave a characterization of the class of pseudo-square polyominoes...
AbstractIt has been proved that, among the polyominoes that tile the plane by translation, the so-ca...
AbstractGolomb (J. Combin. Theory 1 (1966) 280–296) showed that any polyomino which tiles a rectangl...
A permutomino is a polyomino uniquely determined by a pair of permutations. Recently permutominoes, ...
AbstractThe definitions and lattice hierarchy previously established for tiling regions with individ...
AbstractThe definitions and lattice hierarchy previously established for tiling regions with individ...
AbstractGolomb has covered the main previous results of tiling a rectangle with congruent polyominoe...
It has been proved that, among the polyominoes that tile the plane by translation, the so-called squ...
AbstractIt has been proved that, among the polyominoes that tile the plane by translation, the so-ca...
For finite polyomino regions, tileability by a pair of rectangles is NP-complete for all but trivial...
We present a new mathematical model for tiling finite subsets of $\mathbb{Z}^2$ using an arbitrary, ...
The thesis represents a collection of solved problems concerned with covering planar shapes (mostly ...
We present a new type of polyominoes that can have transparent squares (holes). We show how these po...
AbstractGolomb has covered the main previous results of tiling a rectangle with congruent polyominoe...
AbstractOn square or hexagonal lattices, tiles or polyominoes are coded by words. The polyominoes th...
Beauquier and Nivat introduced and gave a characterization of the class of pseudo-square polyominoes...
AbstractIt has been proved that, among the polyominoes that tile the plane by translation, the so-ca...
AbstractGolomb (J. Combin. Theory 1 (1966) 280–296) showed that any polyomino which tiles a rectangl...
A permutomino is a polyomino uniquely determined by a pair of permutations. Recently permutominoes, ...