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32 lines
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32 lines
1.5 KiB
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<p>Given a directed acyclic graph (<strong>DAG</strong>) of <code>n</code> nodes labeled from <code>0</code> to <code>n - 1</code>, find all possible paths from node <code>0</code> to node <code>n - 1</code> and return them in <strong>any order</strong>.</p>
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<p>The graph is given as follows: <code>graph[i]</code> is a list of all nodes you can visit from node <code>i</code> (i.e., there is a directed edge from node <code>i</code> to node <code>graph[i][j]</code>).</p>
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<p> </p>
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<p><strong>Example 1:</strong></p>
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<img alt="" src="https://assets.leetcode.com/uploads/2020/09/28/all_1.jpg" style="width: 242px; height: 242px;" />
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<pre>
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<strong>Input:</strong> graph = [[1,2],[3],[3],[]]
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<strong>Output:</strong> [[0,1,3],[0,2,3]]
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<strong>Explanation:</strong> There are two paths: 0 -> 1 -> 3 and 0 -> 2 -> 3.
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</pre>
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<p><strong>Example 2:</strong></p>
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<img alt="" src="https://assets.leetcode.com/uploads/2020/09/28/all_2.jpg" style="width: 423px; height: 301px;" />
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<pre>
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<strong>Input:</strong> graph = [[4,3,1],[3,2,4],[3],[4],[]]
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<strong>Output:</strong> [[0,4],[0,3,4],[0,1,3,4],[0,1,2,3,4],[0,1,4]]
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</pre>
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<p> </p>
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<p><strong>Constraints:</strong></p>
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<ul>
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<li><code>n == graph.length</code></li>
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<li><code>2 <= n <= 15</code></li>
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<li><code>0 <= graph[i][j] < n</code></li>
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<li><code>graph[i][j] != i</code> (i.e., there will be no self-loops).</li>
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<li>All the elements of <code>graph[i]</code> are <strong>unique</strong>.</li>
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<li>The input graph is <strong>guaranteed</strong> to be a <strong>DAG</strong>.</li>
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</ul>
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