I believe that you can get this working in amortized O(log n) time per element access or value change by using a modification of a splay tree. The idea behind the approach is twofold. First, rather than storing the array as an array, we store it as a pair of an array holding the original values, and a splay tree, where each node's key is the index into the array. For example, given an array of seven elements, the setup might look like this:
Array: 3 1 4 2 5 9 3
/ \. / \
0. 2 4. 6
Note that the tree holds the indices into the array rather than the array elements themselves. If we want to look up a value at a particular index, we simply do a splay tree lookup of the index, then return the array element at the given position, which takes amortized O(log n) time.
The operation you want to support of changing all future values I will call the "ceiling" operation, since it sets up a ceiling on all values after the current. One way to think about this is that each element in the array has a ceiling associated with it (which is initially infinity), and the element's true value is then the minimum of its true value and the ceiling. The trick is that by using the splay tree, we can adjust the ceiling of all values at or beyond a certain point by in amortized O(log n) time. To do this, we augment the splay tree by having each node store a value c which represents the ceiling imposed from that element forward, then make the appropriate changes to c as needed.
For example, suppose that we want to impose a ceiling from some element forward. Let's suppose that this element is already at the root of the tree. In that case, we just set its c value to be the new ceiling in O(1) time. From that point forward, whenever we do a lookup of some value that comes at or after that element, we can make a note of the ceiling as we walk down the tree from the root to the element in question. More generally, as we do a lookup, every time that we follow a right child link, we note the c value of that node. Once we hit the element in question, we know that element's ceiling because we can just take the minimum ceiling of the nodes on the path from the root whose right children we followed. Thus to look up an element in the structure, we do a standard splay tree lookup, tracking the c value was we go, then output the minimum of the origins array value and the c value.
But in order to make this work, our approach has to take into account the fact that the splay tree does rotations. In other words, we have to show how to propagate the c values during a rotation. Suppose that we want to do a rotation like this one:
/. ->. \
In this case, we don't change any c values, since any value looked up after the A will still pass through the A node. However, if we do the opposite rotation and pull A above B, then we set A's c value to be the minimum of B's c value and A's c value, since if we descend into A's left subtree after performing the rotation, we need to factor B's ceiling into account. This means that we do O(1) work per rotation, and since the amortized number of rotations performed per splay is O(log n), we do amortized O(log n) work per lookup.
To complete the picture, to update an arbitrary ceiling, we splay the node whose ceiling is to be changed up to the root, then set its c value.
In short, we have O(log n) lookup O(log n) change times (amortized).
This idea is based on the discussion of link/cut trees from Sleator and Tarjan's original paper "Self-Adjusting Binary Search Trees," which also introduced the splay tree.
Hope this helps!