Here's how I'd go about it. First I'd generate all the ordered n-tuples
(housenumber, color, nationality, pet, drink, smoke)
5^6 of those, 15625, easily manageable. Then I'd filter out the simple boolean conditions. there's ten of them, and each of those you'd expect to filter out 8/25 of the conditions (1/25 of the conditions contain a Swede with a dog, 16/25 contain a non-Swede with a non-dog). Of course they're not independent but after filtering those out there shouldn't be many left.
After that, you've got a nice graph problem. Create a graph with each node representing one of the remaining n-tuples. Add edges to the graph if the two ends contain duplicates in some n-tuple position or violate any 'positional' constraints (there's five of those). From there you're almost home, search the graph for an independent set of five nodes (with none of the nodes connected by edges). If there's not too many, you could possibly just exhaustively generate all the 5-tuples of n-tuples and just filter them again.
This could be a good candidate for code golf. Someone can probably solve it in one line with something like haskell :)
afterthought: The initial filter pass can also eliminate information from the positional constraints. Not much (1/25), but still significant.
