Add array solutions with descriptions

2025-01-13 08:01:03 +01:00 · 2021-08-22 15:45:08 -07:00 · 2021-08-22 15:45:08 -07:00 · e676e283ea
commit e676e283ea
parent 02db2b9550
3 changed files with 180 additions and 0 deletions
--- a/data_structures/arrays/3sum.rb
+++ b/data_structures/arrays/3sum.rb
@ -0,0 +1,80 @@
 #Given an integer array nums, return all the triplets [nums[i], nums[j], nums[k]] ..
 #.. such that i != j, i != k, and j != k, and nums[i] + nums[j] + nums[k] == 0.
 #Notice that the solution set must not contain duplicate triplets.
 #Example 1:
 #Input: nums = [-1,0,1,2,-1,-4]
 #Output: [[-1,-1,2],[-1,0,1]]
 #Example 2:
 #Input: nums = []
 #Output: []
 #Example 3:
 #Input: nums = [0]
 #Output: []
 #Constraints:
 #0 <= nums.length <= 3000
 #-105 <= nums[i] <= 105
 #Two Pointer Approach - O(n) Time / O(1) Space
 #Return edge cases.
 #Sort nums, and init ans array
 #For each |val, index| in nums:
 #if the current value is the same as last, then go to next iteration
 #init left and right pointers for two pointer search of the two sum in remaining elements of array
 #while left < right:
 #find current sum
 #if sum > 0, right -= 1
 #if sum < 0, left += 1
 #if it's 0, then add the values to the answer array, and set the left pointer to the next valid value ..
 #.. (left += 1 while nums[left] == nums[left - 1] && left < right)
 #Return ans[]      
 # @param {Integer[]} nums
 # @return {Integer[][]}
 def three_sum(nums)
    #return if length too short
    return [] if nums.length < 3
    #sort nums, init ans array
    nums, ans = nums.sort, []
    #loop through nums
    nums.each_with_index do |val, ind|
      #if the previous value is the same as current, then skip this iteration as it would create duplicates
      next if ind > 0 && nums[ind] == nums[ind - 1]
      #init & run two pointer search
      left, right = ind + 1, nums.length - 1
      while left < right
        #find current sum
        sum = val + nums[left] + nums[right]
        #decrease sum if it's too great, increase sum if it's too low
        if sum > 0
          right -= 1
        elsif sum < 0
          left += 1
        #if it's zero, then add the answer to array and set left pointer to next valid value
        else
          ans << [val, nums[left], nums[right]]
          left += 1
          while nums[left] == nums[left - 1] && left < right
            left += 1
          end
        end
      end
    end
    #return answer
    ans
 end
--- a/data_structures/arrays/maximum_product_subarray.rb
+++ b/data_structures/arrays/maximum_product_subarray.rb
@ -0,0 +1,44 @@
 #Given an integer array nums, find a contiguous non-empty subarray within the array that has the largest product, and return the product.
 #It is guaranteed that the answer will fit in a 32-bit integer.
 #A subarray is a contiguous subsequence of the array.
 #Example 1:
 #Input: nums = [2,3,-2,4]
 #Output: 6
 #Explanation: [2,3] has the largest product 6.
 #Example 2:
 #Input: nums = [-2,0,-1]
 #Output: 0
 #Explanation: The result cannot be 2, because [-2,-1] is not a subarray.
 #Constraints:
 #1 <= nums.length <= 2 * 104
 #-10 <= nums[i] <= 10
 #The product of any prefix or suffix of nums is guaranteed to fit in a 32-bit integer.
 #Dynamic Programming Approach (Kadane's Algorithm) - O(n) Time / O(1) Space
 #Track both current minimum and current maximum (Due to possibility of multiple negative numbers)
 #Answer is the highest value of current maximum
 # @param {Integer[]} nums
 # @return {Integer}
 def max_product(nums)
    return nums[0] if nums.length == 1
    cur_min, cur_max, max = 1, 1, -11
    nums.each do |val|
      tmp_cur_max = cur_max
      cur_max = [val, val*cur_max, val*cur_min].max
      cur_min = [val, val*tmp_cur_max, val*cur_min].min
      max = [max, cur_max].max
    end
    max
 end
--- a/data_structures/arrays/maximum_subarray.rb
+++ b/data_structures/arrays/maximum_subarray.rb
@ -0,0 +1,56 @@
 #Given an integer array nums, find the contiguous subarray (containing at least one number) which has the largest sum and return its sum.
 #A subarray is a contiguous part of an array.
 #Example 1:
 #Input: nums = [-2,1,-3,4,-1,2,1,-5,4]
 #Output: 6
 #Explanation: [4,-1,2,1] has the largest sum = 6.
 #Example 2:
 #Input: nums = [1]
 #Output: 1
 #Example 3:
 #Input: nums = [5,4,-1,7,8]
 #Output: 23
 #Constraints:
 #1 <= nums.length <= 3 * 104
 #-105 <= nums[i] <= 105
 #Sliding Window Approach - O(n) Time / O(1) Space
 #Init max_sum as first element
 #Return first element if the array length is 1
 #Init current_sum as 0
 #Iterate through the array:
 #if current_sum < 0, then reset it to 0 (to eliminate any negative prefixes)
 #current_sum += num
 #max_sum = current_sum if current_sum is greater than max_sum
 #Return max_sum         
 # @param {Integer[]} nums
 # @return {Integer}
 def max_sub_array(nums)
    #initialize max sum to first number
    max_sum = nums[0]
    #return first number if array length is 1 
    return max_sum if nums.length == 1
    #init current sum to 0
    current_sum = 0
    #iterate through array, reset current_sum to 0 if it ever goes below 0, track max_sum with highest current_sum
    nums.each do |num|
      current_sum = 0 if current_sum < 0
      current_sum += num
      max_sum = [max_sum, current_sum].max
    end
    #return answer
    max_sum
 end