Are there any existing algorithms for finding and avoiding problematic areas (swamps, dead-ends) in pathfinding when using non-grid maps? There are plenty available for grids that either avoid these areas or pseudo-avoid these areas by way of jump point recursion, etc., but I have yet to find anything useful for quadtrees, navigational meshes, or other non-uniform maps.
Dead-end detection and Swamps are not grid specific. They're just evaluated on grid maps.
Such a thing probably does exist - hundreds of path finding and motion planning papers are published every year, but I think you need to ask yourself a bigger question - why would you want to do this?
The idea of going to a nav-mesh or sparse grid representation is to reduce the time required to find a solution by reducing the number of nodes in the graph. If your search is too slow, simply prune the number of nodes and edges in your graph. By manually removing any dead ends from the search offline before you even start, you'll reduce the overhead for every search.
If, even after you have pruned your graph, search is still to slow and you can tolerate approximate solutions to search problems, consider using Weighted A*, where you replan decreasing the inflation factor until you do have the optimal cost.
Planning algorithms are full of compromises, just make sure you understand what the pros and cons are for whatever you choose to do.
One final suggestion, make sure that you have correctly implemented the primitives in the planner you are using - algorithms like A* depend on having correctly implemented priority queues, in particular make sure that decrease-key is O(log n) or better.