Beeing on the discussion on color binding I noticed that I don't understand the concept well enough. How do I figure out if a piece is color binded. For square tilling it is easier but for hex is more difficult. For 3D is also a bit more difficult that for squares. I'm mostly interested about (m,n) leapers on a hexagonal board. Are there color binded twice leapers that are (m1,n1)&(m2,n2)? For example (4,1)&(3,0) is a third board bounded. What about 3D? Can anyone help me with a general math answer?
Beeing on the discussion on color binding I noticed that I don't understand the concept well enough. How do I figure out if a piece is color binded. For square tilling it is easier but for hex is more difficult. For 3D is also a bit more difficult that for squares. I'm mostly interested about (m,n) leapers on a hexagonal board. Are there color binded twice leapers that are (m1,n1)&(m2,n2)? For example (4,1)&(3,0) is a third board bounded. What about 3D? Can anyone help me with a general math answer?