Measuring the Likelihood of Numerical Constraints

Console, Marco; Hofer, Matthias; Libkin, Leonid

doi:10.24963/ijcai.2019/229

Cited by 3 publications

(10 citation statements)

References 6 publications

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“…That is, the ratio Vol (R ) ∩ /Vol( ) shows the proportion of the -dimensional ball of radius occupied by vectors satisfying , and ( ) defines the asymptotic behavior of this ratio. □ Next we use a known fact, namely that ( ) exists for every formula over R. It was shown in [11], using results of [20,22], how to definably approximate volumes of sets definable in R. Combining it with previous results, we obtain the main result of this section. We finish this section by returning to the example from the introduction and computing ( , , ( )), where refers to the only market segment present in the database.…”

Section: The Measure Is Well Definedmentioning

confidence: 92%

“…•¯is the scalar product,¯∈ R and ′ ∈ R. For such a formula , let˜denote its homogenized version, i.e., the formula obtained from by replacing each atomic formula of numerical type¯•¯< ′ by¯•¯< 0. Then we know (see [11]) that…”

Section: Frpas For Conjunctive Queriesmentioning

confidence: 99%

“…As in Section 7, we start with (¯,¯), a database with numerical nulls, and tuples¯,¯and use Theorem 5.4 to produce a formula (¯) with free variables over R so that ( , , (¯,¯)) = ( ). If only uses linear constraints, and is in disjunctive normal form, the existence of an AFPRAS follows from results of [11]. Now, however, the query is in FO(+, •, <) and thus could be a formula over R of arbitrary shape that also uses multiplication, which complicates the search for an AFPRAS considerably.…”

Section: First-order Queries and Additive Error Approximationsmentioning

confidence: 99%

See 2 more Smart Citations

Queries with Arithmetic on Incomplete Databases

Console

Hofer

Libkin

2020

Proceedings of the 39th ACM SIGMOD-SIGACT-SIGAI Symposium on Principles of Database Systems

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The standard notion of query answering over incomplete database is that of certain answers, guaranteeing correctness regardless of how incomplete data is interpreted. In majority of real-life databases, relations have numerical columns and queries use arithmetic and comparisons. Even though the notion of certain answers still applies, we explain that it becomes much more problematic in situations when missing data occurs in numerical columns. We propose a new general framework that allows us to assign a measure of certainty to query answers. We test it in the agnostic scenario where we do not have prior information about values of numerical attributes, similarly to the predominant approach in handling incomplete data which assumes that each null can be interpreted as an arbitrary value of the domain. The key technical challenge is the lack of a uniform distribution over the entire domain of numerical attributes, such as real numbers. We overcome this by associating the measure of certainty with the asymptotic behavior of volumes of some subsets of the Euclidean space. We show that this measure is well-defined, and describe approaches to computing and approximating it. While it can be computationally hard, or result in an irrational number, even for simple constraints, we produce polynomial-time randomized approximation schemes with multiplicative guarantees for conjunctive queries, and with additive guarantees for arbitrary first-order queries. We also describe a set of experimental results to confirm the feasibility of this approach.

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Section: The Measure Is Well Definedmentioning

confidence: 92%

Section: Frpas For Conjunctive Queriesmentioning

confidence: 99%

Section: First-order Queries and Additive Error Approximationsmentioning

confidence: 99%

See 1 more Smart Citation

Queries with Arithmetic on Incomplete Databases

Console

Hofer

Libkin

2020

Proceedings of the 39th ACM SIGMOD-SIGACT-SIGAI Symposium on Principles of Database Systems

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“…Our goal is to define such measures and study their structural and computational properties. This problem was first studied (Console, Hofer, and Libkin 2019) using the following approach. It first defined the measure of a set X restricted to the ball of radius r as m r (X) = Vol(X ∩ B n r )/Vol(B n r ) ∈ [0, 1], and then set m(X) = lim r→∞ m r (X).…”

Section: Default Reasoningmentioning

confidence: 99%

“…The proof of the existence of m(X) cited above relied on a result from (Karpinski and Macintyre 1997) on approximability of volumes by firstorder formulae. The proof of (Console, Hofer, and Libkin 2019) used the result as stated in that paper, but the actual proof of (Karpinski and Macintyre 1997) added an extra assumption. It restricted sets whose volumes are approximated to subsets of [0, 1] n , rather than [−r, r] n for arbitrary r > 0, as the construction of (Console, Hofer, and Libkin 2019) crucially required.…”

Section: Default Reasoningmentioning

confidence: 99%

Reasoning about Measures of Unmeasurable Sets

Console

Hofer

Libkin

2020

Proceedings of the Seventeenth International Conference on Principles of Knowledge Representation and Reasoning

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In a variety of reasoning tasks, one estimates the likelihood of events by means of volumes of sets they define. Such sets need to be measurable, which is usually achieved by putting bounds, sometimes ad hoc, on them. We address the question how unbounded or unmeasurable sets can be measured nonetheless. Intuitively, we want to know how likely a randomly chosen point is to be in a given set, even in the absence of a uniform distribution over the entire space. To address this, we follow a recently proposed approach of taking intersection of a set with balls of increasing radius, and defining the measure by means of the asymptotic behavior of the proportion of such balls taken by the set. We show that this approach works for every set definable in first-order logic with the usual arithmetic over the reals (addition, multiplication, exponentiation, etc.), and every uniform measure over the space, of which the usual Lebesgue measure (area, volume, etc.) is an example. In fact we establish a correspondence between the good asymptotic behavior and the finiteness of the VC dimension of definable families of sets. Towards computing the measure thus defined, we show how to avoid the asymptotics and characterize it via a specific subset of the unit sphere. Using definability of this set, and known techniques for sampling from the unit sphere, we give two algorithms for estimating our measure of unbounded unmeasurable sets, with deterministic and probabilistic guarantees, the latter being more efficient. Finally we show that a discrete analog of this measure exists and is similarly well-behaved.

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Randomized semantic games for fuzzy logics

Hofer

2021

Fuzzy Sets and Systems

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Measuring the Likelihood of Numerical Constraints

Cited by 3 publications

References 6 publications

Queries with Arithmetic on Incomplete Databases

Queries with Arithmetic on Incomplete Databases

Reasoning about Measures of Unmeasurable Sets

Randomized semantic games for fuzzy logics

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