Anonymous Transmission
Functionality Description
Anonymous transmission is a multipartite task which enables two nodes to communicate a message in a network in an anonymous way. More specifically, one of the nodes of the network, a sender, communicates a quantum state to a receiver in a way that their identities remain completely hidden throughout the protocol. In particular, for the sender it implies that her identity remains unknown to all the other nodes, whereas for the receiver it implies that no one except the sender knows her identity. Note that the main goal of anonymous transmission is to fully hide the identities of the sender and the receiver -- it does not aim at guaranteeing the reliability of the transmitted message.
Tags: Multi Party, Quantum Enhanced Classical Functionality, Specific Task
Protocols
- Based on the GHZ state: Quantum Memory Network Stage
- Based on the W state: Quantum Memory Network Stage
- Entanglement Relay: Quantum Memory Network Stage
- Verifiable Quantum Anonymous Transmission: Quantum Memory Network Stage
- GHZ-based protocol is deterministic, whereas W-based protocol is probabilistic, but the W-based protocol tolerates more noise.
- Verifiable GHZ-based protocol allows an imperfect or untrusted GHZ state, and involves a verification stage.
- Entanglement relay protocol does not require a pre-shared multipartite state, but it creates a 4-partite GHZ state during the protocol.
Properties
Security of an anonymous transmission protocol is defined in terms of the guessing probability, i.e., the maximum probability that adversaries guess the identity of the sender or receiver Failed to parse (SVG (MathML can be enabled via browser plugin): Invalid response ("Math extension cannot connect to Restbase.") from server "https://wikimedia.org/api/rest_v1/":): {\displaystyle R} given all the classical and quantum information they have available at the end of the protocol.
- Guessing probability Let be a subset of adversaries among nodes. Let be the register that contains all classical and quantum side information accessible to the adversaries. Then, the probability of adversaries guessing the sender is given by
where the maximisation is taken over the set of POVMs for the adversaries and Failed to parse (SVG (MathML can be enabled via browser plugin): Invalid response ("Math extension cannot connect to Restbase.") from server "https://wikimedia.org/api/rest_v1/":): {\displaystyle \rho_{C|S=i}}
is the state of the adversaries at the end of the protocol, given that node is the sender
- Sender-security We say that an anonymous transmission protocol is sender-secure if, given that the sender is honest, the probability of the adversary guessing the sender is
- Receiver-security We say that an anonymous transmission protocol is receiver-secure if, given that the receiver is honest, the probability of the adversary guessing the receiver is:
Failed to parse (SVG (MathML can be enabled via browser plugin): Invalid response ("Math extension cannot connect to Restbase.") from server "https://wikimedia.org/api/rest_v1/":): {\displaystyle P_{\text{guess}}[R|C,R\notin \mathcal{A}] \leq \max_{i\in[n]} P[R=i|R\notin \mathcal{A}]}
.
The above definitions are general and hold for any adversarial scenario, in particular for an active adversary.
Further Information
- The definitions above guarantee information-theoretic security of the protocol when the resource states are both trusted [4], [1], [2] and not trusted [3], [5] .
References
- Lipinska et al (2018)
- Yang et al (2016)
- Elliot et al (2007)
- Christandl et al (2005)
- Unnikrishnan et al (2018)