Proceedings of the Thirtieth Annual ACM-SIAM Symposium on Discrete Algorithms 2019
DOI: 10.1137/1.9781611975482.3
|View full text |Cite
|
Sign up to set email alerts
|

SETH-Based Lower Bounds for Subset Sum and Bicriteria Path

Abstract: Subset Sum and k-SAT are two of the most extensively studied problems in computer science, and conjectures about their hardness are among the cornerstones of fine-grained complexity.An important open problem in this area is to base the hardness of one of these problems on the other.Our main result is a tight reduction from k-SAT to Subset Sum on dense instances, proving that Bellman's 1962 pseudo-polynomial O * (T )-time algorithm for Subset Sum on n numbers and target T cannot be improved to time T 1−ε · 2 o(… Show more

Help me understand this report

Search citation statements

Order By: Relevance

Paper Sections

Select...
2
1
1

Citation Types

1
74
0

Year Published

2019
2019
2024
2024

Publication Types

Select...
7

Relationship

0
7

Authors

Journals

citations
Cited by 25 publications
(75 citation statements)
references
References 138 publications
1
74
0
Order By: Relevance
“…This solves the non-modular problem since we can assume that all given integers w satisfy w < t without loss of generality. We get (tn) 1−ε · 2 o(n) = t 1−ε · 2 o(n) time algorithm for the non-modular version of the problem, which contradicts SETH (by [ABHS17]). Thus our algorithm is essentially optimal.…”
Section: Discussionmentioning
confidence: 86%
See 2 more Smart Citations
“…This solves the non-modular problem since we can assume that all given integers w satisfy w < t without loss of generality. We get (tn) 1−ε · 2 o(n) = t 1−ε · 2 o(n) time algorithm for the non-modular version of the problem, which contradicts SETH (by [ABHS17]). Thus our algorithm is essentially optimal.…”
Section: Discussionmentioning
confidence: 86%
“…On the optimality of our algorithm The work of [ABHS17] shows that the non-Modular Subset Sum problem cannot be solved in time t 1−ε · 2 o(n) for any constant ε > 0 assuming the Strong Exponential Time Hypothesis (SETH). This lower bound also implies that the Modular Subset Sum problem cannot be solved in time m 1−ε · 2 o(n) .…”
Section: Discussionmentioning
confidence: 99%
See 1 more Smart Citation
“…The m is the number of elements in the small instance and let m ′ = O(m log n) be as in Lemma 4. 4. For now we will assume, that the set of elements is (εt/m ′ )-distinct (we will deal with multiplicities 2 in Lemma 5.7).…”
Section: Small Itemsmentioning
confidence: 99%
“…The strong dependence on t in all of these algorithms makes them impractical for a large t (note that t can be exponentially larger than the size of the input). This dependence has been shown necessary as an O poly(n)t 0.99 algorithm for the Subset Sum would contradict both the SETH [4] and the SetCover conjecture [23].…”
mentioning
confidence: 99%