Search Results

The All-Pairs Shortest Paths (APSP) problem is one of the fundamental problems in theoretical computer science. It asks to compute the distance matrix of a given n-vertex graph. We revisit the classical problem of maintaining the distance matrix under a ...

The “short cycle removal” technique was recently introduced by Abboud, Bringmann, Khoury and Zamir (STOC ’22) to prove fine-grained hardness of approximation. Its main technical result is that listing all triangles in an n^1/2-regular graph is n^2−o(1)-...

We present a new technique for efficiently removing almost all short cycles in a graph without unintentionally removing its triangles. Consequently, triangle finding problems do not become easy even in almost k-cycle free graphs, for any constant k≥ 4.

...

We prove several tight results on the fine-grained complexity of approximating the diameter of a graph. First, we prove that, for any ε>0, assuming the Strong Exponential Time Hypothesis (SETH), there are no near-linear time 2−ε-approximation algorithms ...

We present functions that can be computed in some fixed polynomial time but are hard on average for any algorithm that runs in slightly smaller time, assuming widely-conjectured worst-case hardness for problems from the study of fine-grained complexity. ...