I was thinking about the different techniques to check the validity of a binary search tree. Naturally, the invariant that needs to be maintained is that the left subtree must be less than or equal to the current node, which in turn should be less than or equal to the right subtree. There are a couple of different ways to tackle this problem: The first is to check the constraints for values on each subtree and can be outlined like this (in Java, for integer nodes):

```
public static boolean isBST(TreeNode node, int lower, int higher){
if(node == null) return true;
else if(node.data < lower || node.data > higher) return false;
return isBST(node.left, lower, node.data) && isBST(node.right, node.data, higher);
}
```

There is also another way to accomplish this using an inOrder traversal where you keep track of the previous element and make sure the progression is strictly non-decreasing. Both these methods explore the left subtrees first though, and in the event we have an inconsistency in the middle of the root's right subtree, what is the recommended path? I know that a BFS variant could be used, but would it be possible to use multiple techniques at the same time and is that recommended? For example, we could to a BFS, an inorder and a reverseInorder and return the moment there is a failure detected. This could only maybe be desirable for really large trees in order to reduce the average runtime at the cost of a bit more space and multiple threads accessing the same data structure. Ofcourse, if we're using a simple iterative solution for inorder solution (NOT a morris traversal that modifies the tree) we will be using up O(lgN) space.