#P1503E. 2-Coloring
2-Coloring
No submission language available for this problem.
Description
There is a grid with $n$ rows and $m$ columns. Every cell of the grid should be colored either blue or yellow.
A coloring of the grid is called stupid if every row has exactly one segment of blue cells and every column has exactly one segment of yellow cells.
In other words, every row must have at least one blue cell, and all blue cells in a row must be consecutive. Similarly, every column must have at least one yellow cell, and all yellow cells in a column must be consecutive.
How many stupid colorings of the grid are there? Two colorings are considered different if there is some cell that is colored differently.
The only line contains two integers $n$, $m$ ($1\le n, m\le 2021$).
Output a single integer — the number of stupid colorings modulo $998244353$.
Input
The only line contains two integers $n$, $m$ ($1\le n, m\le 2021$).
Output
Output a single integer — the number of stupid colorings modulo $998244353$.
Samples
2 2
2
4 3
294
2020 2021
50657649
Note
In the first test case, these are the only two stupid $2\times 2$ colorings.