1824 - Minimum Sideway Jumps.

Medium

There is a 3 lane road of length n that consists of n + 1 points labeled from 0 to n. A frog starts at point 0 in the second lane and wants to jump to point n. However, there could be obstacles along the way.

You are given an array obstacles of length n + 1 where each obstacles[i] ( ranging from 0 to 3 ) describes an obstacle on the lane obstacles[i] at point i. If obstacles[i] == 0, there are no obstacles at point i. There will be at most one obstacle in the 3 lanes at each point.

• For example, if obstacles[2] == 1, then there is an obstacle on lane 1 at point 2.

The frog can only travel from point i to point i + 1 on the same lane if there is not an obstacle on the lane at point i + 1. To avoid obstacles, the frog can also perform a side jump to jump to another lane (even if they are not adjacent) at the same point if there is no obstacle on the new lane.

• For example, the frog can jump from lane 3 at point 3 to lane 1 at point 3.

Return the minimum number of side jumps the frog needs to reach any lane at point n starting from lane 2 at point 0.

Note: There will be no obstacles on points 0 and n.

Example 1:

Input: obstacles = 0,1,2,3,0

Output: 2

Explanation: The optimal solution is shown by the arrows above. There are 2 side jumps (red arrows). Note that the frog can jump over obstacles only when making side jumps (as shown at point 2).

Example 2:

Input: obstacles = 0,1,1,3,3,0

Output: 0

Explanation: There are no obstacles on lane 2. No side jumps are required.

Example 3:

Input: obstacles = 0,2,1,0,3,0

Output: 2

Explanation: The optimal solution is shown by the arrows above. There are 2 side jumps.

Constraints:

• obstacles.length == n + 1

• <code>1 <= n <= 5 * 10⁵</code>

• 0 <= obstacles[i] <= 3

• obstacles[0] == obstacles[n] == 0