I was wondering when one should use Prim's algorithm and when Kruskal's to find the minimum spanning tree? They both have easy logics, same worst cases, and only difference is implementation which might involve a bit different data structures. So what is the deciding factor?

Use Prim's algorithm when you have a graph with lots of edges. For a graph with V vertices E edges, Kruskal's algorithm runs in O(E log V) time and Prim's algorithm can run in O(E + V log V) amortized time, if you use a Fibonacci Heap. Prim's algorithm is significantly faster in the limit when you've got a really dense graph with many more edges than vertices. Kruskal performs better in typical situations (sparse graphs) because it uses simpler data structures. 


Kruskal can have better performance if the edges can be sorted in linear time, or are already sorted. Prim's better if the number of edges to vertices is high. 


I found a very nice thread on the net that explains the difference in a very straightforward way : http://www.thestudentroom.co.uk/showthread.php?t=232168. Kruskal's algorithm will grow a solution from the cheapest edge by adding the next cheapest edge, provided that it doesn't create a cycle. Prim's algorithm will grow a solution from a random vertex by adding the next cheapest vertex, the vertex that is not currently in the solution but connected to it by the cheapest edge. Here attached is an interesting sheet on that topic. If you implement both Kruskal and Prim, in their optimal form : with a union find and a finbonacci heap respectively, then you will note how Kruskal is easy to implement compared to Prim. Prim is harder with a fibonacci heap mainly because you have to maintain a bookkeeping table to record the bidirectional link between graph nodes and heap nodes. With a Union Find, it's the opposite, the structure is simple and can even produce directly the mst at almost no additional cost. 


I know that you did not ask for this, but if you have more processing units, you should always consider Borůvka's algorithm, because it might be easily parallelized  hence it has a performance advantage over Kruskal and JarníkPrim algorithm. 


The best time for Kruskal's is O(E logV). For Prim's using fib heaps we can get O(E+V lgV). Therefore on a dense graph, Prim's is much better. 


If we stop the algorithm in middle prim's algorithm always generates connected tree, but kruskal on the other hand can give disconnected tree or forest 


One important application of Kruskal's algorithm is in single link clustering. Consider n vertices and you have a complete graph.To obtain a k clusters of those n points.Run Kruskal's algorithm over the first n(k1) edges of the sorted set of edges.You obtain kcluster of the graph with maximum spacing. 


prims is better for more dense graphs and in this we also not have to pay much attention of cycle by adding edge as primarily we are dealing with nodes.prims is faster than krushkal in case of complex grasphs. 

