leetcode-problemset/leetcode/problem/number-of-increasing-paths-in-a-grid.html

<p>You are given an <code>m x n</code> integer matrix <code>grid</code>, where you can move from a cell to any adjacent cell in all <code>4</code> directions.</p>

<p>Return <em>the number of <strong>strictly</strong> <strong>increasing</strong> paths in the grid such that you can start from <strong>any</strong> cell and end at <strong>any</strong> cell. </em>Since the answer may be very large, return it <strong>modulo</strong> <code>10<sup>9</sup> + 7</code>.</p>

<p>Two paths are considered different if they do not have exactly the same sequence of visited cells.</p>

<p>&nbsp;</p>
<p><strong>Example 1:</strong></p>
<img alt="" src="https://assets.leetcode.com/uploads/2022/05/10/griddrawio-4.png" style="width: 181px; height: 121px;" />
<pre>
<strong>Input:</strong> grid = [[1,1],[3,4]]
<strong>Output:</strong> 8
<strong>Explanation:</strong> The strictly increasing paths are:
- Paths with length 1: [1], [1], [3], [4].
- Paths with length 2: [1 -&gt; 3], [1 -&gt; 4], [3 -&gt; 4].
- Paths with length 3: [1 -&gt; 3 -&gt; 4].
The total number of paths is 4 + 3 + 1 = 8.
</pre>

<p><strong>Example 2:</strong></p>

<pre>
<strong>Input:</strong> grid = [[1],[2]]
<strong>Output:</strong> 3
<strong>Explanation:</strong> The strictly increasing paths are:
- Paths with length 1: [1], [2].
- Paths with length 2: [1 -&gt; 2].
The total number of paths is 2 + 1 = 3.
</pre>

<p>&nbsp;</p>
<p><strong>Constraints:</strong></p>

<ul>
	<li><code>m == grid.length</code></li>
	<li><code>n == grid[i].length</code></li>
	<li><code>1 &lt;= m, n &lt;= 1000</code></li>
	<li><code>1 &lt;= m * n &lt;= 10<sup>5</sup></code></li>
	<li><code>1 &lt;= grid[i][j] &lt;= 10<sup>5</sup></code></li>
</ul>
update 2022-07-12 21:08:31 +08:00			`<p>You are given an <code>m x n</code> integer matrix <code>grid</code>, where you can move from a cell to any adjacent cell in all <code>4</code> directions.</p>`

			`<p>Return <em>the number of <strong>strictly</strong> <strong>increasing</strong> paths in the grid such that you can start from <strong>any</strong> cell and end at <strong>any</strong> cell. </em>Since the answer may be very large, return it <strong>modulo</strong> <code>10<sup>9</sup> + 7</code>.</p>`

			`<p>Two paths are considered different if they do not have exactly the same sequence of visited cells.</p>`

			`<p> </p>`
			`<p><strong>Example 1:</strong></p>`
			`<img alt="" src="https://assets.leetcode.com/uploads/2022/05/10/griddrawio-4.png" style="width: 181px; height: 121px;" />`
			`<pre>`
			`<strong>Input:</strong> grid = [[1,1],[3,4]]`
			`<strong>Output:</strong> 8`
			`<strong>Explanation:</strong> The strictly increasing paths are:`
			`- Paths with length 1: [1], [1], [3], [4].`
			`- Paths with length 2: [1 -> 3], [1 -> 4], [3 -> 4].`
			`- Paths with length 3: [1 -> 3 -> 4].`
			`The total number of paths is 4 + 3 + 1 = 8.`
			`</pre>`

			`<p><strong>Example 2:</strong></p>`

			`<pre>`
			`<strong>Input:</strong> grid = [[1],[2]]`
			`<strong>Output:</strong> 3`
			`<strong>Explanation:</strong> The strictly increasing paths are:`
			`- Paths with length 1: [1], [2].`
			`- Paths with length 2: [1 -> 2].`
			`The total number of paths is 2 + 1 = 3.`
			`</pre>`

			`<p> </p>`
			`<p><strong>Constraints:</strong></p>`

			`<ul>`
			`<li><code>m == grid.length</code></li>`
			`<li><code>n == grid[i].length</code></li>`
			`<li><code>1 <= m, n <= 1000</code></li>`
			`<li><code>1 <= m * n <= 10<sup>5</sup></code></li>`
			`<li><code>1 <= grid[i][j] <= 10<sup>5</sup></code></li>`
			`</ul>`