Author:
Amarilli Antoine,Kimelfeld Benny
Abstract
The reliability of a Boolean Conjunctive Query (CQ) over a tuple-independent
probabilistic database is the probability that the CQ is satisfied when the
tuples of the database are sampled one by one, independently, with their
associated probability. For queries without self-joins (repeated relation
symbols), the data complexity of this problem is fully characterized by a known
dichotomy: reliability can be computed in polynomial time for hierarchical
queries, and is #P-hard for non-hierarchical queries.
Inspired by this dichotomy, we investigate a fundamental counting problem for
CQs without self-joins: how many sets of facts from the input database satisfy
the query? This is equivalent to the uniform case of the query reliability
problem, where the probability of every tuple is required to be 1/2. Of course,
for hierarchical queries, uniform reliability is solvable in polynomial time,
like the reliability problem. We show that being hierarchical is also necessary
for this tractability (under conventional complexity assumptions). In fact, we
establish a generalization of the dichotomy that covers every restricted case
of reliability in which the probabilities of tuples are determined by their
relation.
Publisher
Centre pour la Communication Scientifique Directe (CCSD)
Cited by
2 articles.
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