Dynamic programming is an algorithmic technique for efficiently solving problems with a recursive structure containing many overlapping subproblems.
The link between dynamic programming and recursion is actually very strong.
Any dynamic programming solution can be transformed into a recursive solution (with memoization), with identical performance characteristics, e.g O(n*n). The difference is primarily one of presentation.
In order to be amenable to dynamic programming, the formulation of a problem must have the optimal substructure property.
The longest common subsequence problem is a good example of a problem that can be solved with dynamic programming.