Anonymous Conference Key Agreement using GHZ states

We require the following for this protocol:

1. A source of n-party GHZ states
2. Private randomness sources
3. A randomness source that is not associated with any party
4. A classical broadcasting channel
5. Pairwise private communication channels

• First, the sender notifies each receiver in the network anonymously
• The entanglement source generates and distributes sufficient GHZ states to all nodes in the network
• The GHZ states are distilled to establish multipartite entanglement shared only by the participating parties (the sender and receivers)
• Each GHZ state is randomly chosen to be used for either Verification or Key Generation. For Key Generation rounds, a single bit of the key is established using one GHZ state by measuring in the Z-basis
• If the sender is content with the Verification results, they can anonymously validate the protocol and conclude that the key has been established successfully.

Protocol 1: Anonymous Verifiable Conference Key Agreement

Input: Parameters ${\displaystyle L}$  and ${\displaystyle D}$ 

Requirements: A source of n-party GHZ states; private randomness sources; a randomness source that is not associated with any party; a classical broadcasting channel; pairwise private communication channels

Goal: Anonymoous generation of key between sender and ${\displaystyle m}$  receivers

1. The sender notifies the ${\displaystyle m}$  receivers by running the Notification protocol
2. The source generates and shares ${\displaystyle L}$  GHZ states
3. The parties run the Anonymous Multipartite Entanglement protocol on the GHZ states
4. For each ${\displaystyle (m+1)}$ -partite GHZ state, the parties do the following:
   • They ask a source of randomness to broadcast a bit ${\displaystyle b}$  such that Pr${\displaystyle [b=1]={\frac {1}{D}}}$ 
   • Verification round: If b = 0, the sender runs Verification as verifier on the state corresponding to that round, while only considering the announcements of the ${\displaystyle m}$  receivers. The remaining parties announce random values.
   • KeyGen round: If b = 1, the sender and receivers measure in the Z-basis.
5. If the sender is content with the checks of the Verification protocol, they can anonymously validate the protocol

Protocol 2: Notification

Input: Sender's choice of ${\displaystyle m}$  receivers

Goal: The ${\displaystyle m}$  receivers get notified

Requirements: Private pairwise classical communication channels and randomness sources

For agent ${\displaystyle i=1,...,n}$ :

1. All agents ${\displaystyle j\in \{1,...,n\}}$  do the following:
   • When agent ${\displaystyle j}$  is the sender: If ${\displaystyle i}$  is not a receiver, the sender chooses ${\displaystyle n}$  random bits ${\displaystyle \{r_{j,k}^{i}\}_{k=1}^{n}}$  such that ${\displaystyle \bigoplus _{k=1}^{n}r_{j,k}^{i}=0}$ . Otherwise, if ${\displaystyle i}$  is a receiver, the sender chooses ${\displaystyle n}$  random bits such that ${\displaystyle \bigoplus _{k=1}^{n}r_{j,k}^{i}=1}$ . The sender sends bit ${\displaystyle r_{j,k}^{i}}$  to agent ${\displaystyle k}$ 
   • When agent ${\displaystyle j}$  is not the sender: The agent chooses ${\displaystyle n}$  random bits ${\displaystyle \{r_{j,k}^{i}\}_{k=1}^{n}}$  such that ${\displaystyle \bigoplus _{k=1}^{n}r_{j,k}^{i}=0}$  and sends bit ${\displaystyle r_{j,k}^{i}}$  to agent ${\displaystyle k}$ 
2. All agents ${\displaystyle k\in \{1,...,n\}}$  receive ${\displaystyle \{r_{j,k}^{i}\}_{j=1}^{n}}$ , and compute ${\displaystyle z_{k}^{i}=\bigoplus _{j=1}^{n}r_{j,k}^{i}}$  and send it to agent ${\displaystyle i}$ 
3. Agent ${\displaystyle i}$  takes the received ${\displaystyle \{z_{k}^{i}\}_{k=1}^{n}}$  to compute ${\displaystyle z^{i}=\bigoplus _{k=1}^{n}z_{k}^{i}}$ . If ${\displaystyle z^{i}=1}$ , they are thereby notified to be a designated receiver.

Protocol 3: Anonymous Multiparty Entanglement

Input: ${\displaystyle n}$ -partite GHZ state ${\displaystyle {\frac {1}{\sqrt {2}}}(|0\rangle ^{\otimes n}+|1\rangle ^{\otimes n})}$ 

Output: ${\displaystyle (m+1)}$ -partite GHZ state ${\displaystyle {\frac {1}{\sqrt {2}}}(|0\rangle ^{\otimes (m+1)}+|1\rangle ^{\otimes (m+1)})}$  shared between the sender and receivers

Requirements: A broadcast channel; private randomness sources

1. Sender and receivers draw a random bit each. Everyone else measures their qubits in the X-basis, yielding a measurement outcome bit ${\displaystyle x_{i}}$ 
2. All parties broadcast their bits in a random order, or if possible, simultaneously.
3. The sender applies a Z gate to their qubit if the parity of the non-participating parties' bits is odd.

Protocol 4: Verification

Input: A verifier V; a shared state between ${\displaystyle k}$  parties

Goal: Verification or rejection of the shared state as the GHZ${\displaystyle _{k}}$  state by V

Requirements: Private randomness sources; a classical broadcasting channel

1. Everyone but V draws a random bit ${\displaystyle b_{i}}$  and measures in the X or Y basis if their bit equals 0 or 1 respectively, obtaining a measurement outcome ${\displaystyle m_{i}}$ . V chooses both bits at random
2. Everyone (including V) broadcasts ${\displaystyle (b_{i},m_{i})}$ 
3. V resets her bit such that ${\displaystyle \sum _{i}b_{i}=0(}$ mod ${\displaystyle 2)}$ . She measures in the X or Y basis if her bit equals 0 or 1 respectively, thereby also resetting her ${\displaystyle m_{i}=m_{v}}$ 
4. V accepts the state if and only if ${\displaystyle \sum _{i}m_{i}={\frac {1}{2}}\sum _{i}b_{i}(}$ mod ${\displaystyle 2)}$