You are given a 0-indexed integer array nums and two integers key and k. A k-distant index is an index i of nums for which there exists at least one index j such that |i - j| <= k and nums[j] == key.
Return a list of all k-distant indices sorted in increasing order.
Input: nums = [3,4,9,1,3,9,5], key = 9, k = 1 Output: [1,2,3,4,5,6] Explanation: Here, nums[2] == key and nums[5] == key. - For index 0, |0 - 2| > k and |0 - 5| > k, so there is no j where |0 - j| <= k and nums[j] == key. Thus, 0 is not a k-distant index. - For index 1, |1 - 2| <= k and nums[2] == key, so 1 is a k-distant index. - For index 2, |2 - 2| <= k and nums[2] == key, so 2 is a k-distant index. - For index 3, |3 - 2| <= k and nums[2] == key, so 3 is a k-distant index. - For index 4, |4 - 5| <= k and nums[5] == key, so 4 is a k-distant index. - For index 5, |5 - 5| <= k and nums[5] == key, so 5 is a k-distant index. - For index 6, |6 - 5| <= k and nums[5] == key, so 6 is a k-distant index. Thus, we return [1,2,3,4,5,6] which is sorted in increasing order.
Input: nums = [2,2,2,2,2], key = 2, k = 2 Output: [0,1,2,3,4] Explanation: For all indices i in nums, there exists some index j such that |i - j| <= k and nums[j] == key, so every index is a k-distant index. Hence, we return [0,1,2,3,4].
1 <= nums.length <= 10001 <= nums[i] <= 1000keyis an integer from the arraynums.1 <= k <= nums.length
implSolution{pubfnfind_k_distant_indices(nums:Vec<i32>,key:i32,k:i32) -> Vec<i32>{letmut ret = vec![];for j in0..nums.len(){if nums[j] == key {for i in(j asi32 - k).max(0)..(j asi32 + k + 1).min(nums.len()asi32){if i > *ret.last().unwrap_or(&-1){ ret.push(i);}}}} ret }}