Bricks, like Sudoku, is a type of latin square puzzle. All latin square puzzles use the same broad template:
Start with an NxN square grid.
Fill in cells with digits from 1 to N.
Don’t repeat numbers in any row or column.
Beyond that, each variant of a latin square puzzle has its own special requirements to give it a unique feel. For a Bricks puzzle, this involves the 1×2 “bricks” subdividing the grid.
Fill in the grid with the numbers 1 to N (N being the length of a side), without repeating a digit in any row or column.
Each 1×2 “brick” contains one odd and one even number.
If the dimensions of the grid are even (6×6, 8×8, etc), half-bricks at each end of a row are considered one brick.
Otherwise, half-bricks are simply a digit not used elsewhere in the row.
Basic Techniques to Solve
In Bricks puzzles, the techniques tend to work together in such a way that it’s impractical to give examples without using a whole grid. This time, I’m just going to summarize the tips, and we’ll go straight into solving our example puzzle.
Prioritize rows and columns with more known numbers.
Use the even/odd requirement of whole bricks to narrow down candidates. Note that in any odd-sized wall (9×9, 7×7, etc), the half-bricks at the ends will always be odd.
Cross-reference with multiple rows/columns to find a number position in one row/column.
Marking candidates is a powerful tool.
Solving the Puzzle
In Sudoku puzzles, you would normally start by scanning along a row or column of a given number to find its position in one of the 3×3 regions. Because Bricks puzzles don’t have these regions, those methods don’t help, and it can be difficult to find where to start. That’s why priority one is always to look for rows and columns that have the most given numbers. Ideally, you want them to be mostly even, or mostly odd.
Fill the grid with the numbers 1-9 such that there are no duplicates in any row, column, or 3×3 region. At the bottom of this tutorial are several variants for which the solving process is basically the same.
Fill in the grid with the numbers 1-9 such that there are no duplicates in any row, column, or 3×3 region. Inequality symbols between adjacent cells indicate which cell has the greater number.
Fill in numbers from 1 to N (N is the size of the grid) such that there are no duplicates in rows or columns. Inequality symbols between adjacent cells indicate which number is larger.