# Problems

## Problems 2013-02-25

Diamond L(2,1) D(21,9,9,0,0,0)
Moderately difficult
Here the shapes are pushed over to become diamonds. This wraps side to side but not top to bottom.

Film L(2,1) D(21,8,7,0,0,0)
Moderately difficult
Similar to the regular 9 by 9 Sudoku but the squares have lumps in the top and bottom. The problem wraps top to bottom but not side to side so the overall geometry is a cylinder.

Jigsaw L(2,1) D(23,8,7,0,0,0)
Moderately difficult
As regular 9 by 9 but the normal 3X3 boxes are irregular shapes

People L(2,3) D(16,15,14,3,2,0)
Difficult
The shapes have “lumps” on each side to become quite irregular. They look to me like little people. This problem wraps top to bottom and side to side so the overall geometry is like a doughnut (torus).

Toroid H L(2,3) D(18,18,17,3,1,0)
Difficult
The normal 3X3 boxes are replaced by horizontal stripes (helices) which wrap around the problem. These stripes join the left side to the right side and the top to the bottom so that the overall geometry is a doughnut (torus).

## Problems 2013-02-18

4X4 Cube L(3,1) D(37,10,10,0,0,0)
Moderately difficult
Strictly a 2 dimensional problem since only considering the outside faces which are laid out onto a plain. There are 16 Characters which cannot repeat in any band or face. 3 of the bands are highlighted. There are 12 bands and 6 faces, each with 16 Cells. There are 16 possible characters so I use a standard hexadecimal character set: 0,1,2,…,9,a,…,f.

Diamond L(2,3) D(21,13,12,2,1,0)
Difficult
Here the shapes are pushed over to become diamonds. This wraps side to side but not top to bottom.

Jigsaw L(2,1) D(21,9,9,0,0,0)
Moderate
As regular 9 by 9 but the normal 3X3 boxes are irregular shapes

People L(2,1) D(22,11,11,0,0,0)
Moderately difficult
The shapes have “lumps” on each side to become quite irregular. They look to me like little people. This problem wraps top to bottom and side to side so the overall geometry is like a doughnut (torus).

Toroid V L(2,1) D(18,7,7,0,0,0)
Moderately difficult
The shapes have “lumps” on each side to become quite irregular. They look to me like little people. This problem wraps top to bottom and side to side so the overall geometry is like a doughnut (torus).

## Problems 2013-02-11

Jigsaw L(2,3) D(19,17,16,1,1,0)
Difficult
As regular 9 by 9 but the normal 3X3 boxes are irregular shapes

People L(2,1) D(20,8,7,0,0,0)
Moderately difficult
The shapes have “lumps” on each side to become quite irregular. They look to me like little people. This problem wraps top to bottom and side to side so the overall geometry is like a doughnut (torus)

Samurai L(2,1) D(111,7,6,0,0,0)
Moderately easy but time consuming due to the size of the problem
Effectively 5 intersecting 9 by 9 Sudoku problems.

Sudoku 9X9X L(1,1) D(22,7,6,0,0,0)
Easy
As regular 9 by 9 but must also have unique characters in each diagonal, highlighted.

Toroid H L(2,1) D(16,17,16,0,0,0)
Moderately difficult
The normal 3X3 boxes are replaced by horizontal stripes (helices) which wrap around the problem. These stripes join the left side to the right side and the top to the bottom so that the overall geometry is a doughnut (torus).

## Problems 2013-02-04

4X4 Cube L(3,3) D(41,13,12,3,1,0)
Difficult
Strictly a 2 dimensional problem since only considering the outside faces which are laid out onto a plain. There are 16 Characters which cannot repeat in any band or face. 3 of the bands are highlighted. There are 12 bands and 6 faces, each with 16 Cells. There are 16 possible characters so I use a standard hexadecimal character set: 0,1,2,…,9,a,…,f.

Film L(2,1) D(22,6,6,0,0,0)
Moderate
Similar to the regular 9 by 9 Sudoku but the squares have lumps in the top and bottom. The problem wraps top to bottom but not side to side so the overall geometry is a cylinder.

Jigsaw L(2,1) D(27,5,4,0,0,0)
Moderate
As regular 9 by 9 but the normal 3X3 boxes are irregular shapes

People L(2,1) D(19,7,6,0,0,0)
Moderate
The shapes have “lumps” on each side to become quite irregular. They look to me like little people. This problem wraps top to bottom and side to side so the overall geometry is like a doughnut (torus).

Toroid V L(2,3) D(18,12,11,2,1,0)
Difficult
The normal 3X3 boxes are replaced by vertical stripes (helices) which wrap around the problem. These stripes join the left side to the right side and the top to the bottom so that the overall geometry is a doughnut (torus).