Investigating the Conjectures of Fine-Grained Complexity

HORIZON.1.1HORIZON-ERCID: 101078482
EC Contribution
€14,993
Consortium Size
1 orgs
Summary

Fine-grained complexity theory identifies a small set of conjectures under which a large number of hardness results hold. The fast-growing list of such conditional hardness results already spans many diverse areas of computer science. Improved algorithms for some of the most central problems in these domains are deemed impossible unless one of the core conjectures turns out to be false, terminating decades-long quests for faster algorithms. Much research is going into closing the remaining gaps, addressing more domains, and achieving beyond-worst-case results.But should these conjectures, that are the foundation of this entire theory, really be treated as laws of nature? In addition to three primary conjectures, the community has put forth about ten others. These ``secondary conjectures'' are often stronger variants of the primary conjectures, stating that the core problems remain hard despite introducing new assumptions on the input; they let us prove more hardness results but are also less extensively studied (and less likely to be true) compared to the original conjectures.Stepping away from current research that is hustling towards achieving tight bounds for all important problems under such conjectures, this project aims to investigate the conjectures themselves. Our main objective is to resolve the secondary conjectures; either by falsifying them or by establishing their equivalence to a primary conjecture. Either of these two outcomes would be satisfying: Refuting a conjecture must involve disruptive algorithmic techniques, impacting numerous other problems. Unifying a secondary conjecture with an original (primary) conjecture reinforces the validity of the conjecture and all its implications, solidifying the very foundations of Fine-Grained Complexity. We believe that there is a pressing need for such an investigation of this rapidly growing theory.

Consortium (1)

Project Results (9)

Source: CORDIS, the EU research results database.

Publications (9)
Deterministic 3SUM-Hardness
ITCS 2024· 2024DOI
Fischer, Kaliciak, Polak
Faster Combinatorial k-Clique Algorithms
Lecture Notes in Computer Science, LATIN 2024: Theoretical Informatics· 2024DOI
Amir Abboud, Nick Fischer, Yarin Shechter
New Graph Decompositions and Combinatorial Boolean Matrix Multiplication Algorithms
STOC 2024· 2024DOI
Abboud, Fischer, Kelly, Meka, Lovett
The Time Complexity of Fully Sparse Matrix Multiplication
SODA 2024· 2024DOI
Abboud, Bringmann, Fischer, Kunnemann
Worst-Case to Expander-Case Reductions: Derandomized and Generalized
ESA 2024· 2024DOI
Abboud and Wallheimer
All-Pairs Max-Flow is no Harder than Single-Pair Max-Flow: Gomory-Hu Trees in Almost-Linear Time
FOCS 2023· 2023DOI
Abboud, Li, Panigrahi, Saranurak
Listing 4-cycles
FSTTCS 2023· 2023DOI
Abboud, Khoury, Leibowitz, Safier
Stronger 3-SUM Lower Bounds for Approximate Distance Oracles via Additive Combinatorics
STOC 2023· 2023DOI
Abboud, Bringmann, Fischer
Worst-Case to Expander-Case Reductions
ITCS 2023· 2023DOI
Abboud and Wallheimer