Abstract
In this work we study local computation with advice: the goal is to solve a graph problem Π with a distributed algorithm in f (Δ) communication rounds, for some function f that only depends on the maximum degree Δ of the graph, and the key question is how many bits of advice per node are needed. Our main results are: (1) Any locally checkable labeling problem (LCL) can be solved in graphs with sub-exponential growth with only 1 bit of advice per node. Moreover, we can make the set of nodes that carry advice bits arbitrarily sparse. (2) The assumption of sub-exponential growth is necessary: assuming the Exponential-Time Hypothesis (ETH), there are LCLs that cannot be solved in general with any constant number of bits per node. (3) In any graph we can find an almost-balanced orientation (indegrees and outdegrees differ by at most one) with 1 bit of advice per node, and again we can make the advice arbitrarily sparse. (4) As a corollary, we can also compress an arbitrary subset of edges so that a node of degree d stores only d/2 + 2 bits, and we can decompress it locally, in f(Δ) rounds. (5) In any graph of maximum degree Δ, we can find a Δ-coloring (if it exists) with 1 bit of advice per node, and again, we can make the advice arbitrarily sparse. (6) In any 3-colorable graph, we can find a 3-coloring with 1 bit of advice per node. Here, it remains open whether we can make the advice arbitrarily sparse.
Original language | English |
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Title of host publication | PODC 2024 - Proceedings of the 2024 ACM Symposium on Principles of Distributed Computing |
Place of Publication | United States |
Publisher | ACM |
Pages | 117-120 |
Number of pages | 4 |
ISBN (Electronic) | 979-8-4007-0668-4 |
DOIs | |
Publication status | Published - 17 Jun 2024 |
MoE publication type | A4 Conference publication |
Event | ACM Symposium on Principles of Distributed Computing - Nantes, France Duration: 17 Jun 2024 → 21 Jun 2024 |
Conference
Conference | ACM Symposium on Principles of Distributed Computing |
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Abbreviated title | PODC |
Country/Territory | France |
City | Nantes |
Period | 17/06/2024 → 21/06/2024 |
Keywords
- Distributed advice
- Distributed decompression
- Locality