1. Basic Heap Operations
· Implement a Min Heap
· Implement a Max Heap
· Insert an Element into a Min Heap
· Insert an Element into a Max Heap
· Delete the Minimum Element from a Min Heap
· Delete the Maximum Element from a Max Heap
· Peek the Minimum Element in a Min Heap
· Peek the Maximum Element in a Max Heap
· Heapify an Array (Build a Heap)
· Convert an Array into a Min Heap or Max Heap
2. Heap Construction and Maintenance
· Convert a Min Heap to a Max Heap
· Convert a Max Heap to a Min Heap
· Implement Heap Sort (Ascending and Descending Order)
· Decrease Key in a Min Heap
· Increase Key in a Max Heap
· Find the Kth Largest Element in an Array (Using a Max Heap)
· Find the Kth Smallest Element in an Array (Using a Min Heap)
· Merge K Sorted Lists (Using a Min Heap)
· Merge K Sorted Arrays (Using a Min Heap)
· K Closest Points to the Origin (Using a Min Heap)
3. Heap-Based Problem Solving
· Top K Frequent Elements (Using a Min Heap)
· Find Median of a Stream of Integers (Using Two Heaps)
· Sliding Window Maximum (Using a Double-Ended Queue or Heap)
· Kth Largest Element in a Stream (Using a Min Heap)
· Kth Smallest Element in a Stream (Using a Max Heap)
· Shortest Path in a Weighted Graph (Dijkstra’s Algorithm with a Min Heap)
· Find the Range of a Given Subarray with Minimum Sum (Using a Min Heap)
· Find the Median of a Set of Numbers (Using Two Heaps)
· Longest Subarray with Sum Less Than K (Using a Min Heap)
· Reconstruct a Heap from a Given Set of Values
4. Advanced Heap Problems
· Find All Valid Combinations with Sum Equal to Target (Using a Min Heap)
· Implement a Priority Queue Using Heaps
· Find the Maximum Sum of a Subarray of Size K (Using a Max Heap)
· Find the Maximum Sum of k Non-Overlapping Subarrays (Using a Max Heap)
· Heap-Based Approach to Solve Job Scheduling Problems
· Implement a Median Maintenance Algorithm (Using Two Heaps)
· Find Top K Elements in a Matrix (Using a Min Heap)
· Sort K-Sorted Array (Using a Min Heap)
· Rearrange Characters in a String so No Two Adjacent Characters are the Same (Using a Max Heap)
· Implement a Heap-Based Algorithm to Solve the Traveling Salesman Problem (Approximate Solution)
5. Heap Applications in Graph Algorithms
· Implement Prim’s Algorithm for Minimum Spanning Tree (Using a Min Heap)
· Implement Kruskal’s Algorithm for Minimum Spanning Tree (Using Union-Find and Min Heap)
· Find the Shortest Path in a Graph with Non-Negative Weights (Using Dijkstra’s Algorithm with a Min Heap)
· Find the Longest Path in a Graph with Positive Weights (Using a Max Heap)
· Compute the Minimum Cost Path in a Weighted Grid (Using a Min Heap)
· Find All Pair Shortest Paths (Using Floyd-Warshall with Heap Optimization)
· Implement A* Search Algorithm (Using a Min Heap)
· Compute the Shortest Path Tree from a Source Node (Using Dijkstra’s Algorithm with a Min Heap)
· Find the Most Frequent Path in a Graph (Using a Max Heap)
· Compute the Minimum Cost to Connect All Nodes (Using Prim’s Algorithm with a Min Heap)
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