Abstract
We initiate the study of the one-shot capacity of communication (coded) networks with an adversary having access only to a proper subset of the network edges. We introduce the Diamond Network as a minimal example to show that known cut-set bounds are not sharp in general, and that their non-sharpness comes precisely from restricting the action of the adversary to a region of the network. We give a capacity-achieving scheme for the Diamond Network that implements an adversary detection strategy. We also show that linear network coding does not suffice in general to achieve capacity, proving a strong separation result between the one-shot capacity and its linear version. We then give a sufficient condition for tightness of the Singleton Cut-Set Bound in a family of two-level networks. Finally, we discuss how the presence of nodes that do not allow local encoding and decoding does or does not affect the one-shot capacity.
Original language | English |
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Pages (from-to) | 236-241 |
Number of pages | 6 |
Journal | IFAC-PapersOnLine |
Volume | 55 |
Issue number | 30 |
DOIs | |
Publication status | Published - 2022 |
Event | 25th International Symposium on Mathematical Theory of Networks and Systems, MTNS 2022 - Bayreuthl, Germany Duration: 12 Sept 2022 → 16 Sept 2022 Conference number: 25 |
Keywords
- adversarial network
- capacity
- cut-set bound
- Network coding