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@ -968,10 +968,6 @@ $$
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- 当 $j$ 等于 $1$ ,即上一轮跳了 $1$ 阶时,这一轮只能选择跳 $2$ 阶;
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- 当 $j$ 等于 $2$ ,即上一轮跳了 $2$ 阶时,这一轮可选择跳 $1$ 阶或跳 $2$ 阶;
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![考虑约束下的递推关系](intro_to_dynamic_programming.assets/climbing_stairs_constraint_state_transfer.png)
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<p align="center"> Fig. 考虑约束下的递推关系 </p>
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在该定义下,$dp[i, j]$ 表示状态 $[i, j]$ 对应的方案数。由此,我们便能推导出以下的状态转移方程:
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$$
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@ -981,6 +977,10 @@ dp[i, 2] = dp[i-2, 1] + dp[i-2, 2]
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\end{cases}
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$$
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![考虑约束下的递推关系](intro_to_dynamic_programming.assets/climbing_stairs_constraint_state_transfer.png)
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<p align="center"> Fig. 考虑约束下的递推关系 </p>
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最终,返回 $dp[n, 1] + dp[n, 2]$ 即可,两者之和代表爬到第 $n$ 阶的方案总数。
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=== "Java"
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