LeetCode 1536 – Minimum Swaps to Arrange a Binary Grid
Minimum Swaps to Arrange a Binary Grid
LeetCode 1536 looks like a matrix manipulation problem — but it’s actually a greedy row placement problem. Once you understand the core idea, the solution becomes simple.
📌 Problem Summary
You are given an n × n binary grid.
- You can swap adjacent rows only.
- Your goal is to rearrange rows so that for every row
i, all elements above the main diagonal are0.
If it is impossible, return -1.
🧠 Key Insight
We don’t care about the full row. We only care about:
👉 Number of trailing zeros in each row
Because the diagonal condition means:
Row 0 → needs at least (n-1) trailing zeros Row 1 → needs at least (n-2) trailing zeros Row 2 → needs at least (n-3) trailing zeros ...
📌 Example
Input: [ [0,0,1], [1,1,0], [1,0,0] ]
Step 1: Count Trailing Zeros
Row 0 → 1 trailing zero Row 1 → 1 trailing zero Row 2 → 2 trailing zeros
Convert to array:
[1, 1, 2]
Step 2: Required Zeros Per Position
For n = 3: Row 0 needs ≥ 2 Row 1 needs ≥ 1 Row 2 needs ≥ 0
🔁 Step-by-Step Swapping
Position 0 needs ≥ 2 zeros.
Index 0 → 1 ❌ Index 1 → 1 ❌ Index 2 → 2 ✅
Bubble row at index 2 upward:
[1, 1, 2] Swap → [1, 2, 1] Swap → [2, 1, 1]
Swaps = 2
Remaining rows already satisfy condition.
Final Answer = 2
🔥 Why Greedy Works
- Top rows require the most trailing zeros.
- We must place the earliest valid row immediately.
- If we delay, we may lose feasibility.
This is essentially:
Greedy row placement + bubble swaps
💻 Java Implementation
class Solution {
public int minSwaps(int[][] grid) {
int n = grid.length;
int[] trailingZeros = new int[n];
// Count trailing zeros
for (int i = 0; i < n; i++) {
int count = 0;
for (int j = n - 1; j >= 0; j--) {
if (grid[i][j] == 0) count++;
else break;
}
trailingZeros[i] = count;
}
int swaps = 0;
for (int i = 0; i < n; i++) {
int required = n - 1 - i;
int j = i;
while (j < n && trailingZeros[j] < required) {
j++;
}
if (j == n) return -1;
while (j > i) {
int temp = trailingZeros[j];
trailingZeros[j] = trailingZeros[j - 1];
trailingZeros[j - 1] = temp;
j--;
swaps++;
}
}
return swaps;
}
}
⏱ Complexity Analysis
- Counting trailing zeros → O(n²)
- Bubble swaps (worst case) → O(n²)
Total Time Complexity: O(n²)
⚠️ Common Mistakes
- Trying to swap columns ❌
- Thinking diagonal must be 1 ❌
- Using dynamic programming ❌
Remember: This is NOT a matrix problem. It is a greedy placement problem.
📌 Final Takeaway
When solving grid problems:
- Identify the property that matters.
- Ignore unnecessary details.
- Reduce the problem to a simpler structure.
Here, everything reduces to: