Nine Lords a' Leaping (Madhouse Chaos Construction)

(Eingestellt am 4. Juni 2025, 20:33 Uhr von kingoffries)

Somebody mixed up all the noblemen's territory, and the lords are hopping mad! Help determine which lord owns what land and valuables before it is too late!

This is what I call a "Madhouse" (or perhaps Crazyhouse) Chaos Construction Sudoku, in which the regular rule in a Chaos Construction, that each region is orthogonally connected with itself, is removed. I hope you all enjoy this small change.

Put the digits 1-9 in each row and column. In addition, place the digits 1-9 into 9 disjoint regions, in which all digits in a sub-region are connected horizontally. Digits from the same region that touch vertically are considered to be in separate subregions.

Regions may leap vertically to a different row. When the ends of two or more subregions from the same region are in the same column, a leap always occurs. For counting purposes, count the minimum number of leaps if there are more than two ends of the same region in a column.

Black numbers on the border will help determine where the subregions and leaps occur. Not all black numbers are necessarily given. Each side has a different rule and a different clue for their respective row or column as follows:
To the left, digits show the number of subregions and are contained in the rightmost subregion.
To the right, digits show the largest allowed region and are contained in a region of that size.
On the top, digits show the number of cells that are a mid-section (not necessarily the mid-point) of a subregion, and are in one of those cells.
On the bottom, digits show the number of leaps and also see a number of skyscrapers, with each digit n on the grid representing a skyscraper of height n. Higher values obscure vision.

Additionally, a green number shows the sum of all digits that participate in a leap on that column.

Place the digits 1-9 in each white circle, square, and diamond. Each region contains exactly one of each shape.
Squares mark an end of a subregion. Circles mark a mid-section of a subregion. Diamonds mark the end of a subregion, and either leap to the square in its region or are in direct view of the circle in its subregion (or both).

The grey square is even.

Sample Puzzle Unsolved: