Score : $400$ points
We have a large square grid with $H$ rows and $W$ columns. Iroha is now standing in the top-left cell. She will repeat going right or down to the adjacent cell, until she reaches the bottom-right cell.
However, she cannot enter the cells in the intersection of the bottom $A$ rows and the leftmost $B$ columns. (That is, there are $A×B$ forbidden cells.) There is no restriction on entering the other cells.
Find the number of ways she can travel to the bottom-right cell.
Since this number can be extremely large, print the number modulo $10^9+7$.
The input is given from Standard Input in the following format:
$H$ $W$ $A$ $B$
Print the number of ways she can travel to the bottom-right cell, modulo $10^9+7$.
2 3 1 1
2
We have a $2×3$ grid, but entering the bottom-left cell is forbidden. The number of ways to travel is two: "Right, Right, Down" and "Right, Down, Right".
10 7 3 4
3570
There are $12$ forbidden cells.
100000 100000 99999 99999
1
100000 100000 44444 55555
738162020