This is an ambitious question from a Wolfram Science Conference: Is there such a thing as **a network analog of a recursive function**? Maybe a kind of iterative "map-reduce" pattern? If we add interaction to iteration, things become complicated: continuous iteration of a large number of interacting entities can produce very complex results. It would be nice to have a way of seeing the consequences of the myriad interactions that define a complex system. Can we find a counterpart of a recursive function in an iterative network of connected nodes which contain nested propagation loops?

One of the basic patterns of distributed computation is Map-Reduce: it can be found in Cellular Automata (CA) and Neural Networks (NN). Neurons in NN collect informations through their synapses (reduce) and send it to other neurons (map). Cells in CA act similar, they gather informations from their neighbors (reduce), apply a transition rule (reduce), and offer the result to their neighbors again. Thus >if< there is a network analog of a recursive function, then Map-Reduce is certainly an important part of it. What kind of iterative "map-reduce" patterns exist? Do certain kinds of "map-reduce" patterns result in certain kinds of streams or even vortices or whirls? Can we formulate a calculus for map-reduce patterns?