Fine grained complexity of coloring unit disks

Series
Combinatorics Seminar
Time
Friday, February 17, 2017 - 3:05pm for 1 hour (actually 50 minutes)
Location
Skiles 005
Speaker
Csaba BirĂ³ – University of Louisville – http://www.math.louisville.edu/~biro/
Organizer
Fidel Barrera-Cruz
Many classical hard algorithmic problems on graphs, like coloring, clique number, or the Hamiltonian cycle problem can be sped up for planar graphs resulting in algorithms of time complexity $2^{O(\sqrt{n})}$. We study the coloring problem of unit disk intersection graphs, where the number of colors is part of the input. We conclude that, assuming the Exponential Time Hypothesis, no such speedup is possible. In fact we prove a series of lower bounds depending on further restrictions on the number of colors. Generalizations for other shapes and higher dimensions were also achieved. Joint work with E. Bonnet, D. Marx, T. Miltzow, and P Rzazewski.