Arbitrated Quantum Digital Signature: Difference between revisions

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This [https://www.researchgate.net/publication/321657113_Public-key_quantum_digital_signature_scheme_with_one-time_pad_private-key example protocol] provides a quantum digital signature scheme where the public (known to all) and private (secret key preserved with the seller) keys are classical in nature, however the signature has a quantum nature. This is based directly on public-key cryptography where the seller's identity is used to generate the public-key and [https://en.wikipedia.org/wiki/One-time_pad one-time pad] generates the private key.
This [https://www.researchgate.net/publication/321657113_Public-key_quantum_digital_signature_scheme_with_one-time_pad_private-key example protocol] provides a quantum digital signature scheme where the public (known to all) and private (secret key preserved with the seller) keys are classical in nature, however the signature has a quantum nature. This scheme is based on public-key cryptography where the seller's identity is used to generate the public-key and [https://en.wikipedia.org/wiki/One-time_pad one-time pad] generates the private key.
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* In the signing process, the [[Glossary#Quantum One Way Function|quantum one-way function]] used to create the quantum digest is assumed to take polynomial time to compute and is hard to invert.
* In the signing process, the [[Glossary#Quantum One Way Function|quantum one-way function]] used to create the quantum digest is assumed to take polynomial time to compute and is hard to invert.
* Seller and PKG are assumed to have a pre-shared quantum key (say, using [[Quantum Key Distribution|QKD]])
* Seller and PKG are assumed to have a pre-shared quantum key (say, using [[Quantum Key Distribution|QKD]])
* Secure quantum channel between seller and buyer is assumed


==Outline==
==Outline==


Like other QDS protocols, it is divided into two phases: Distribution (Key Generation, Signature Distribution) and Messaging (signing/verification). This scheme is presented between seller (one who signs the message), buyer (one whom the signed message is sent) and PKG (generates and distributes public-private key for seller) and a buyer.</br>
Like other QDS protocols, it is divided into two phases: Distribution and Messaging. This scheme is presented between the seller (one who signs the message), the buyer (one whom the signed message is sent) and PKG (generates and distributes public-private key for the seller) and a buyer. </br> Distribution includes the generation of public and private keys as follows
* '''Key Generation''': In this step, PKG generates derives the public key of the seller and generates a private key which is secretly sent to Seller over insecure classical channel. Seller's public key is derived from her personal information such as her email-id over a public channel. A quantum one way function (QOWF) is chosen by PKG randomly and secretly, which uses the classical public key as its input. The quantum pre-shared common key (assumption) was used to one-time pad the outcome of QOWF into a cipher-text (secret text) using [[Arbitrated Quantum Digital Signature#References|Quantum Vernam Cipher (1), (2)]]. This cipher-text was communicated to seller (over insecure channel). Seller un-pads the cipher-text to obtain the outcome of QOWF using the pre-shared common key. Hence, everyone knows seller's public key and, only PKG and seller know her private key.  
* '''Key Generation''': In this step, PKG generates the public key of the seller and generates a private key which is secretly sent to Seller over the insecure classical channel.  
* '''Signature''': In this step, the Signer generates a signature quantum state using the message they want send, their public and private keys. The Signer also selects a quantum one way function publicly to generate the quantum digest.
**Seller's public key is derived from her personal information such as her email-id over a public channel. A one-way function is chosen by PKG randomly and secretly (known as the master key), which uses the classical public key as its input.  
** The Signer selects two random strings and generates a quantum state of the message using these random strings.
**A random OTP of the same length as the outcome of the function (random key), is used to convert it (the outcome) into seller's private key by performing bit-wise modulo 2 sum (exclusive OR gate).
** The public and the private key are used to generate the signature quantum state from the state produced in the previous step.
**The quantum pre-shared common key (assumption) is then used to one-time pad the private key via [[Arbitrated Quantum Digital Signature#References|Quantum Vernam Cipher (1), (2)]]. The one-time padded cipher-text is then communicated to the seller (over the insecure channel).  
** The Signer then generates a private key state using the two selected random numbers and the private key. Along with that a basis state is generated, which is a set of basis of each qubit in the private key state.  
**Seller un-pads the cipher-text to obtain the private key using the pre-shared common key. Hence, in the end, everyone knows the seller's public key and, only PKG and seller know her private key.  
** Signer then generates a quantum digital digest using the quantum one way function with the message and private key state as input. This process is repeated several times to generate few copies of the quantum digest.
Messaging comprises of the following steps
** The shared key with PKG is used to encrypt the quantum digest using the quantum Vernam cipher and then it is delivered to PKG.  
* '''Signing''': In this step, the seller generates a signature quantum state using the message she wants to send, her public key and private key. The seller selects a quantum one-way function publicly to generate a quantum digest (directory) using these classical inputs. Seller repeats each step for each message bit.
** PKG decrypts the received ciphertext state and announces publicly that the messages are ready for the Verifier to download and verify.
** Seller selects two random strings and generates a quantum state of the message using these random strings to operate a Unitary gate and [[Glossary#Quantum Gates|Hadamard Transform]] on a null/vacuum state (see [[Arbitrated Quantum Digital Signature#Pseudo Code|Pseudo Code]] for operations)
** Signers sends the signature to Verifier which includes the signature quantum state, plain text message, timestamp and basis state.
** The public and the private key are used to perform Hadamard transformation on the state produced in the previous step in order to generate the signature quantum state.
** The Seller then performs some operation using her private key and measures the quantum state. It can be shown the states were one of the BB84 states and hence, can have one of the two possible bases ([[Glossary#Quantum States|X basis, Z basis or + basis,x basis]]) and four possible states. She records the basis and classical bit representing the state obtained.  
**Seller then concatenates these classical bits, the two random string bits, and a timestamp unique to the signature. The concatenated classical string is used as the input of publicly chosen QOWF, to get the output called 'quantum digest'. She produces some copies of quantum digest for each recipient (buyer).
**Seller then encrypts the timestamp and quantum output of QOWF with pre-shared common key via quantum vernam cipher. PKG unpads these and publicly announces for buyer's verification step.  
** Sellers sends the signature to the buyer which includes the signature quantum state, message, timestamp and basis states.


* '''Verify''': In this method, the verifier checks the authenticity of the signature.
* '''Verification''': In this method, buyer checks the authenticity of the signature (whether the message has come from a genuine seller).
** The Verifier uses Signer's public key and the signature sent to generate a quantum state. According to the Basis state set, the Verifier measures this quantum state and the result of this measurement is converted to a set of classical 2-bit string.
** The buyer performs some quantum gates on the signature quantum state, using seller's public key and message. He measures the resulting quantum state, using basis states for each qubit sent in the signature. The result thus, obtained is represnted by a classical string, in the same way as done by seller.
** One of the randomly selected string by the Signer can be easily inferred by the Verifier from the state after the measurement. The Verifier is then able to generate their own copy of quantum digital digest using the publicly announced quantum one way function.
**The result should reveal the random string used by seller and hence, buyer can also generate the same number of copies of the quantum digest using the publicly known QOWF.
** Verifier now publicly gains the timestamp and quantum digital digest from PKG and verifies that state with the produced quantum digital digest in the above step with the SWAP test. As the SWAP test has a probabilistic result, it is performed several times with the copies of quantum digital digest and then verified.
**Buyer, thus, compares his outputs of QOWF with the ones sent by the seller using [[Glossary#SWAP test|quantum SWAP Test]]. If the number of matches is greater than the accepted/decided threshold value, the signature is accepted else it is rejected.
** If the test is passed the message from the Signer would be valid otherwise it is rejected.


==Notation==
==Notation==
* <math>n</math>: Total number of qubits of message.
* <math>n</math>: Total number of qubits of message.
* <math>k_{pub}</math>: Signer's public key, where <math>k_{pub} \in \{0,1\}^n</math>.
* <math>f</math>: public function to obtain public key from user's email-id
* <math>k_{pri}</math>: Signer's private, where <math>k_{pri} \in \{0,1\}^n</math>.
* <math>k_{pub}</math>: Seller's public key, where <math>k_{pub} \in \{0,1\}^n</math>.
* <math>k_r</math>: Random OTP number selected by PKG to denote each of Signer's signatures, where <math>k_{r} \in \{0,1\}^n</math>.
* <math>k_{pri}</math>: Seller's private, where <math>k_{pri} \in \{0,1\}^n</math>.
* <math>k_{at}</math>: Shared key between the Signer and PKG where <math>k_{at} \in \{0,1\}^n</math>.
* <math>k_r</math>: Random OTP number selected by PKG to denote each of Seller's signatures, where <math>k_{r} \in \{0,1\}^n</math>.
* <math>VC(x,y)</math>: function VC performs one time pads 'y' using quantum pad key 'x' via [[Arbitrated Quantum Digital Signature#References|Quantum Vernam Cipher (1), (2)]].
* <math>k_{at}</math>: Shared key between the Seller and PKG where <math>k_{at} \in \{0,1\}^n</math>.
* <math>E_{k_{at}}</math>: Quantum Vernam cipher encrypted state which uses <math>k_{at}</math>.
* <math>E_{k_{at}}</math>: Quantum Vernam cipher encrypted state which uses <math>k_{at}</math>.
* <math>G</math>: PKG's master key which is a one way function where <math>\{0,1\}^n \xrightarrow{}\{0,1\}^n</math> .
* <math>G</math>: PKG's master key which is a one way function where <math>\{0,1\}^n \xrightarrow{}\{0,1\}^n</math> .
* <math>F</math>: Public quantum one way function selected by Signer to generate quantum digest.
* <math>F</math>: Public quantum one way function selected by Seller to generate quantum digest.
* <math>m</math>: Message sent by Signer to the Verifier, where <math>m \in \{0,1\}^n</math>.
* <math>m</math>: Message sent by Seller to the Buyer, where <math>m \in \{0,1\}^n</math>.
* <math>s</math>: Random string of uniform distribution selected by the Signer, where <math>s \in \{0,1\}^n</math>.
* <math>s</math>: Random string of uniform distribution selected by the Seller, where <math>s \in \{0,1\}^n</math>.
* <math>t</math>: Random string of uniform distribution selected by the Signer, where <math>t \in \{0,1\}^n</math>.
* <math>t</math>: Random string of uniform distribution selected by the Seller, where <math>t \in \{0,1\}^n</math>.
*<math>l</math>: qubit address
* <math>|\phi\rangle_{a_l,b_l}</math>: Quantum state which is defined by
* <math>|\phi\rangle_{a_l,b_l}</math>: Quantum state which is defined by
<math>|\phi\rangle_{a_l,b_l} := H^{a_l}U_{\frac{\pi}{4}}H^{b_l}|0\rangle</math>
<math>|\phi\rangle_{a_l,b_l} := H^{a_l}U_{\frac{\pi}{4}}H^{b_l}|0\rangle</math>
* <math>|\phi\rangle_{a_l,b_l,c_l}</math>: Quantum state which is defined by
* <math>|\phi\rangle_{a_l,b_l,c_l}</math>: Quantum state which is defined by
<math>|\phi\rangle_{a_l,b_l,c_l} := Y^{c_l}|\phi\rangle_{a_l,b_l}</math>
<math>|\phi\rangle_{a_l,b_l,c_l} := Y^{c_l}|\phi\rangle_{a_l,b_l}</math>
* <math>|S\rangle_{k_{pri},m}</math>: Signature quantum state for message $m$ which is the quantum state
* <math>|S\rangle_{k_{pri},m}</math>: Signature quantum state for message <math>m</math> which is the quantum state
<math>|S\rangle_{k_{pri},m} = \bigotimes^{n}_{l=1} H^{k_{pub_l}\oplus k_{pri_l}} |\phi\rangle_{s_l,t_l\oplus m_l, m_l}</math>
<math>|S\rangle_{k_{pri},m} = \bigotimes^{n}_{l=1} H^{k_{pub_l}\oplus k_{pri_l}} |\phi\rangle_{s_l,t_l\oplus m_l, m_l}</math>
* <math>|P\rangle</math>: Private key quantum state where <math>|P\rangle \in \{|+\rangle, |-\rangle, |1\rangle, |0\rangle\}^n</math> and it is the quantum state:
* <math>|P\rangle</math>: Private key quantum state where <math>|P\rangle \in \{|+\rangle, |-\rangle, |1\rangle, |0\rangle\}^n</math> and it is the quantum state:
<math>|P\rangle := H^{k_{pri}}|\phi\rangle_{s, t\oplus m}</math>
<math>|P\rangle := H^{k_{pri}}|\phi\rangle_{s, t\oplus m}</math>
* <math>P</math>: Classical 2n-bit for <math>n</math>-qubit <math>|P\rangle</math> where <math>|+\rangle</math> is encoded to 10, <math>|-\rangle</math> to 11, <math>|1\rangle</math> to 00 and <math>|0\rangle</math> is encoded to 01.
* <math>P</math>: Classical 2n-bit for <math>n</math>-qubit <math>|P\rangle</math> where <math>|+\rangle</math> is encoded to 10, <math>|-\rangle</math> to 11, <math>|1\rangle</math> to 00 and <math>|0\rangle</math> is encoded to 01.
* <math>B_P</math>: This is the set of the basis of each qubit state in <math>|P\rangle</math>.
* <math>B_l</math>: This is the set of the basis of each <math>l^th</math> qubit in <math>|P\rangle</math>.
<math> B_P = Basis(|P\rangle) \in \{+,\times \}</math>
<math> B_l \in \{+,\times \}</math>
*<math>B_l(|P_l\rangle)</math>: Measurement of <math>l^{th}</math> qubit in basis <math>B_l</math>
*<math>b_l</math>: measurement result of <math>l^{th}</math> qubit in the concerned quantum state
* <math>|F\rangle</math>: Quantum digital digest received by PKG.
* <math>|F\rangle</math>: Quantum digital digest received by PKG.
* <math>|F\rangle'</math>: Quantum digital digest generated by Verifier.
* <math>|F\rangle'</math>: Quantum digital digest generated by Buyer.
* <math>u</math>: The most number of verifiers in this scheme.
* <math>u</math>: The most number of Buyer in this scheme.
* <math>w</math>: Safety parameter threshold for acceptance.
* <math>w</math>: Safety parameter threshold for acceptance.
* <math>w_0</math>: Security threshold decided in advance.
* <math>w_0</math>: Security threshold decided in advance.
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<math>|V\rangle_{m, k_{pub},S} := Y^m H^{k_{pub}}|S\rangle_{k_{pri}, m}</math>
<math>|V\rangle_{m, k_{pub},S} := Y^m H^{k_{pub}}|S\rangle_{k_{pri}, m}</math>
This state is also expressed as <math>\beta|\phi\rangle_{k_{pri}\oplus s, t\oplus m}</math> where <math>\beta \in \{1, -1, \iota, -\iota\}</math>
This state is also expressed as <math>\beta|\phi\rangle_{k_{pri}\oplus s, t\oplus m}</math> where <math>\beta \in \{1, -1, \iota, -\iota\}</math>
* <math>|Q\rangle</math>: Result of Verifier's measurement of <math>|V\rangle_{m, k_{pub},S}</math>.
* <math>Q</math>: Classical bit string denoted as <math>Q \in \{00, 01, 10, 11\}^n</math>. It is proven that <math>P=Q</math>.
* <math>Q</math>: Classical bit string denoted as <math>Q \in \{00, 01, 10, 11\}^n</math>. It is proven that <math>P=Q</math>.
*<math>g(Q)</math>: g is a classical function which when takes classical 2n bit string Q, gives seller's random string t as output. This function can be calculated.
* <math>\delta</math>: <math>\langle F|F\rangle'</math>, where <math>\delta \in [0,1)</math>.
* <math>\delta</math>: <math>\langle F|F\rangle'</math>, where <math>\delta \in [0,1)</math>.


==Hardware Requirements==
==Hardware Requirements==
*'''Network Stage''':[[:Category:Quantum Memory Network Stage|Prepare and Measure]][[Category:Quantum Memory Network Stage]]
*The total number of qubits used in this protocol is equal to the total number of qubits in the message.
*The total number of qubits used in this protocol is equal to the total number of qubits in the message.
* Secure quantum channel between Signer and Verifier
* Secure quantum channel between seller and buyer
* Quantum channel between Signer and PKG
 
* Private database for both Signer and PKG
==Knowledge Graph==
* Measurement devices for the Verifier.
 
{{graph}}


==Properties==
==Properties==
* The protocol assumes the PKG to be a trusted party.
* This protocol cannot be broken even if the adversary had unlimited computing power.
* This protocol cannot be broken even if the adversary had unlimited computing power.
* In this protocol, it is proven that no adversary can break the secrecy of the Signer's signature private key.
* In this protocol, it is proven that no adversary can break the secrecy of the seller's signature private key.
* The quantum digital signature produces in this protocol is impossible to repudiate and cannot be forged in any condition.
* The quantum digital signature produced in this protocol is impossible to repudiate and cannot be forged in any condition.
* In the protocol the public and the private key belong to the classical bits, only the signature cipher has quantum nature.
* In the protocol the public and the private key belonging to the classical bits, only the signature cipher has quantum nature.
* No Certificate Authority is required to manage digital public-key certificate of Signers.
* No Certificate Authority is required to manage digital public-key certificate of sellers.
* If  <math>|F\rangle = |F\rangle'</math>, the measuring result <math>|0\rangle</math> occurs with probability 1, otherwise it occurs with probability <math>\frac{1+\delta^2}{2}</math>. Hence, when repeated for <math>w</math> times, the probability of equality is at least 1-<math>(\frac{1+\delta^2}{2})^w</math>.
* If  <math>|F\rangle = |F\rangle'</math>, the measuring result <math>|0\rangle</math> occurs with probability 1, otherwise it occurs with probability <math>\frac{1+\delta^2}{2}</math>. Hence, when repeated for <math>w</math> times, the probability of equality is at least 1-<math>(\frac{1+\delta^2}{2})^w</math>.


==Pseudocode==
==Protocol Description==
'''Stage 1''': Key Generation </br>
<u>'''Stage 1'''</u> Key Distribution </br>
'''Output''': Signer receives <math>k_{pri}</math> from the PKG.
'''Input''': Seller and PKG (<math>k_{at}</math>)</br>
'''Output''': Seller and PKG (<math>k_{pri}</math>); Everyone (<math>k_{pub}</math>)


* <math>k_{pub}</math> is generated on the basis of Signer's public identity information like email or person ID-card.
#PKG generates <math>k_{pub}= f(</math>Seller's email-id)
* PKG aquires <math>k_{pub}</math> through open channels.
# PKG randomly chooses <math>G</math>, <math>k_r</math>
* PKG selects <math>G</math> randomly as its master key.
# PKG calculates <math>k_{pri} := G(k_{pub}) \oplus k_{r} </math>
* PKG selects <math>k_{r}</math> randomly.
# PKG encrypts <math>VC(k_{at},k_{pri})=E_{k_{at}}</math>
* PKG calculates <math>k_{pri}</math> as
# Seller decrypts <math>VC(k_{at}, E_{k_{at}})=k_{pri}</math>.
<div style="text-align: center;"><math>k_{pri} := G(k_{pub}) \oplus k_{r} </math></div>
* PKG uses <math>k_{at}</math> to encrypt <math>k_{pri}</math> and transmits <math>E_{k_{at}}</math> to Signer.
* Signer decrypts <math>E_{k_{at}}</math> using <math>k_{at}</math> and receives <math>k_{pri}</math>.


'''Stage 2''': Signature</br>
<u>'''Stage 2.1'''</u> Messaging: Signature</br>
'''Output''': PKG receives the quantum digest <math>|F\rangle</math> and the Verifier receives the Signature <math>(ts, m, B_P,|S\rangle_{k_{pri}, m})</math> from the Signer.
'''Input''': Seller (<math>k_{pri}</math>, <math>m</math>, <math>k_{pub}</math>) </br>
'''Output''': PKG (<math>|F\rangle</math>), Buyer (Signature <math>(ts, m, B_P,|S\rangle_{k_{pri}, m})</math>


* Signer wants to sign the message <math>m</math>.
# Seller randomly chooses <math>s</math> and <math>t</math>.
* Signer selects <math>s</math> and <math>t</math>.
# <math>\forall l\epsilon\{1,..,n\}</math>, Seller operates <math>Y^{m_l}H^{s_l}U_{\frac{\pi}{4}}H^{t_l\oplus m_l}|0\rangle=|\phi\rangle_{s_l,t_l\oplus m_l, m_l}</math>
* For <math>l = 1, 2, ...n</math>:
#<math>\forall l\epsilon\{1,..,n\}</math>, Seller generates <math> |S\rangle_{{k_{pri}}_l,m_l} = H^{k_{pub_l}\oplus k_{pri_l}}|\phi\rangle_{s_l,t_l\oplus m_l, m_l}</math>
** Signer generates the state <math>|\phi\rangle_{s_l,t_l\oplus m_l, m_l}</math>, which is:
#<math>\forall l\epsilon\{1,..,n\}</math>, Seller generates <math>|P\rangle_l = H^{k_{pri_l}} |\phi\rangle_{s_l, t_l\oplus m_l}</math></div>
<div style="text-align: center;"><math> |\phi\rangle_{s_l,t_l\oplus m_l, m_l}  = Y^{m_l}H^{s_l}U_{\frac{\pi}{4}}H^{t_l\oplus m_l}|0\rangle</math></div>
#For <math>l = 1, 2, ...n</math>:
* For <math>l = 1, 2, ...n</math>:
##Seller chooses <math>B_l \epsilon_R\{+,\times\}</math>
** Signer generates the Signature quantum state <math>|S\rangle_{{k_{pri}}_l,m_l}</math>, which is
##Seller measures in basis <math>B_l: B_l(|P_l\rangle)=b_l</math>
<div style="text-align: center;"><math> |S\rangle_{{k_{pri}}_l,m_l} = H^{k_{pub_l}\oplus k_{pri_l}}|\phi\rangle_{s_l,t_l\oplus m_l, m_l}</math></div>
##'''If''' <math>B_l = +</math> '''then'''
* For <math>l = 1, 2, ...n</math>:
###'''If''' <math>b_l=1</math> '''then''' <math>P_l=00</math> '''else''' <math>P_l=01</math>
** Signer generates the private key  quantum state <math>|P\rangle_l</math>, which is
##'''If''' <math>B_l = \times</math> '''then'''
<div style="text-align: center;"><math>|P\rangle_l = H^{k_{pri_l}} |\phi\rangle_{s_l, t_l\oplus m_l}</math></div>
###'''If''' <math>b_l=1</math> '''then''' <math>P_l=10</math> '''else''' <math>P_l=11</math>
**  The classical <math>P_l</math> is calculated based on <math>|P\rangle_l</math>.
# For <math>k = 1, 2, ...u w</math>:
** The basis set is formed by Signer is:
## For <math>l = 1, 2, ...n</math>:
<div style="text-align: center;"><math>  B_{P_l} = Basis(|P\rangle_l) \in \{+,\times \} </math></div>
### <math> |F\rangle_l = |F(t_l||m_l||P_l|| t_l s_l)\rangle_l</math></div>
# Seller encrypts <math>VC(k_{at},(ts, \otimes^{uw}_{l=1}|F\rangle ))=E_{k_{at}}</math> and sends to PKG
# PKG decrypts  <math>VC(k_{at},E_{k_{at}})=(ts, \otimes^{uw}_{l=1}|F\rangle )</math>
# PKG announces publicly that the quantum digest is ready.
# Seller transmits '''Signature''' <math>(ts, m, B, |S\rangle_{k_{pri}, m})</math> to buyer.


* For <math>k = 1, 2, ...u w</math>: Different copies of the quantum digital digest state is prepared.
<u>'''Stage 2.2'''</u> Messaging: Verification</br>
** For <math>l = 1, 2, ...n</math>:
'''Input:''' Buyer (Signature <math>(ts, m, B, |S\rangle_{k_{pri}, m})</math>, public key <math>(k_{pub})</math>)</br>
# The quantum digital digest state <math>|F\rangle_l</math> is prepared by Signer, where:
'''Output''': Buyer accepts or rejects the signature
<div style="text-align: center;"><math> |F\rangle_l = |F(t_l||m_l||P_l|| t_l s_l)\rangle_l</math></div>
# Buyer operates: <math>Y^mH^{k_{pub}}|S\rangle_{k_{pri}, m}=|V\rangle_{m, k_{pub},S}</math>.
#For <math>l = 1, 2, ... w</math>:  
##Buyer measures <math>|V\rangle_{{(m, k_{pub},S)}_{l}}</math> in basis <math>B_l: B_l(|V_l\rangle_{{(m, k_{pub},S)}_{l}})=b_l</math>
##'''If''' <math>B_l = +</math> '''then'''
###'''If''' <math>b_l=1</math> '''then''' <math>Q_l=00</math> '''else''' <math>Q_l=01</math>
##'''If''' <math>B_l = \times</math> '''then'''
###'''If''' <math>b_l=1</math> '''then''' <math>Q_l=10</math> '''else''' <math>Q_l=11</math>
# Buyer obtains <math>t=g(Q)</math>
# Buyer receives <math>(ts, \otimes^{w}_{l=1} |F\rangle)</math> from PKG.
# For <math>k = 1, 2, ... w'</math>:  
## Buyer generates <math> |F\rangle' = |F(t||m||Q||t s)\rangle</math></div>
## Buyer receives <math>(ts, |F\rangle)</math> from PKG.
## Buyer performs SWAP test: '''QSWAP'''(<math>|F\rangle,|F\rangle'</math>)
##If '''QSWAP'''=true, '''then''' <math>w'=w'+1</math>
# If <math>w'>w_0</math> buyer '''accepts'''
#'''Else''' buyer '''rejects'''


==Further Information==
Like most other classical digital signature schemes which provide unconditional security, this scheme also requires a trusted arbitrator who distributes the public key to the recipients. This protocol was preceded by a few other protocols which use an arbitrator to establish quantum digital signatures, most of which used entangled states.
#[https://arxiv.org/abs/quant-ph/0109007 Zeng and Keitel (2002)]
#[https://arxiv.org/abs/quant-ph/0511224 Wang et al (2005)]
#[https://journals.aps.org/pra/abstract/10.1103/PhysRevA.79.054307 Li et al (2009)]
#[https://arxiv.org/ftp/arxiv/papers/1003/1003.2337.pdf Zhou and Qiu (2010)]
#[http://adsabs.harvard.edu/abs/2011EPJD...61..773Y Guang et al (2011)]
#[http://citeseerx.ist.psu.edu/viewdoc/download?doi=10.1.1.414.2231&rep=rep1&type=pdf Zou et al (2013)]
#[https://ieeexplore.ieee.org/stamp/stamp.jsp?arnumber=6992228 Wang et al (2014)]
#[https://iopscience.iop.org/article/10.1088/0253-6102/68/3/317/meta Li et al (2017)]


* Signer encrypts <math>|F\rangle</math> using quantum Vernam cipher and sends <math>E_{k_{at}}(ts, \otimes^{uw}_{l=1}|F\rangle)</math> to PKG.
* PKG decrypts  <math>E_{k_{at}}(ts, \otimes^{uw}_{l=1}|F\rangle)</math> using <math>k_{at}</math> and gets <math>(ts, \otimes^{uw}_{l=1}|F\rangle)</math>.
* PKG announces publicly that the quantum digest is ready.
* Signer transmits <math>(ts, m, B_P, |S\rangle_{k_{pri}, m})</math> to Verifier, which is the signature.
'''Stage 3''': Verification</br>
'''Output''': <math>m</math> is considered valid or is rejected by the Verifier.
* Verifier receives <math>|k\rangle_{pub}</math> from open channels.
* Verifier generates the state <math>|V\rangle_{m, k_{pub},S}</math>.
* For <math>l = 1, 2, ... w</math>:
** Verifier measure the state <math>|V\rangle_{{(m, k_{pub},S)}_{l}}</math> according to the basis (diagonal or horizontal) in <math>B_{P_l}</math>.
** The result of the measurement is recorded as <math>|Q\rangle_l</math>, which is converted to <math>Q_l</math>.
* <math>t</math> is inferred by the Verifier using <math>Q</math>
* Verifier gains <math>(ts, \otimes^{w}_{l=1} |F\rangle)</math> from PKG.
* For <math>k = 1, 2, ... w'</math>:
** Verifier generates <math>|F\rangle'</math> using <math>F</math> by the calculation
<div style="text-align: center;"><math> |F\rangle' = |F(t||m||Q||t s)\rangle</math></div>
** Verifier gains <math>(ts, |F\rangle)</math> from PKG.
** Verifier performs SWAP test between <math>|F\rangle</math> and <math>|F\rangle'</math>.
* If <math>w'>w_0</math> and measurement result everytime =  <math>|0\rangle'</math>:
**  Verifier counts the message <math>m</math> as valid.
* else:
** <math>m</math> is rejected by the Verifier.
==Further Information==
Like most other classical digital signature schemes which provide unconditional security, this scheme also requires a trusted arbitrator who distributes public key to the recipients.
==References==
==References==
#[https://arxiv.org/abs/quant-ph/0003059 BR (2000)]
#[https://arxiv.org/abs/quant-ph/0003059 BR (2000)]
#[https://www.sciencedirect.com/science/article/pii/S0378437106010119 Zhou et al. (2006)]
#[https://www.sciencedirect.com/science/article/pii/S0378437106010119 Zhou et al. (2006)]
<div style='text-align: right;'>''*contributed by Rhea Parekh''</div>
<div style='text-align: right;'>''*contributed by Rhea Parekh and Shraddha Singh''</div>

Latest revision as of 15:26, 16 October 2019

This example protocol provides a quantum digital signature scheme where the public (known to all) and private (secret key preserved with the seller) keys are classical in nature, however the signature has a quantum nature. This scheme is based on public-key cryptography where the seller's identity is used to generate the public-key and one-time pad generates the private key.

Tags: Quantum Digital Signature, Public key cryptography, Specific Task, Multi Party

Assumptions[edit]

  • The protocol assumes perfect state preparation, transmissions, and measurements.
  • Private-key generation (PKG) is a trusted third party, arbitrator.
  • In the signing process, the quantum one-way function used to create the quantum digest is assumed to take polynomial time to compute and is hard to invert.
  • Seller and PKG are assumed to have a pre-shared quantum key (say, using QKD)
  • Secure quantum channel between seller and buyer is assumed

Outline[edit]

Like other QDS protocols, it is divided into two phases: Distribution and Messaging. This scheme is presented between the seller (one who signs the message), the buyer (one whom the signed message is sent) and PKG (generates and distributes public-private key for the seller) and a buyer.
Distribution includes the generation of public and private keys as follows

  • Key Generation: In this step, PKG generates the public key of the seller and generates a private key which is secretly sent to Seller over the insecure classical channel.
    • Seller's public key is derived from her personal information such as her email-id over a public channel. A one-way function is chosen by PKG randomly and secretly (known as the master key), which uses the classical public key as its input.
    • A random OTP of the same length as the outcome of the function (random key), is used to convert it (the outcome) into seller's private key by performing bit-wise modulo 2 sum (exclusive OR gate).
    • The quantum pre-shared common key (assumption) is then used to one-time pad the private key via Quantum Vernam Cipher (1), (2). The one-time padded cipher-text is then communicated to the seller (over the insecure channel).
    • Seller un-pads the cipher-text to obtain the private key using the pre-shared common key. Hence, in the end, everyone knows the seller's public key and, only PKG and seller know her private key.

Messaging comprises of the following steps

  • Signing: In this step, the seller generates a signature quantum state using the message she wants to send, her public key and private key. The seller selects a quantum one-way function publicly to generate a quantum digest (directory) using these classical inputs. Seller repeats each step for each message bit.
    • Seller selects two random strings and generates a quantum state of the message using these random strings to operate a Unitary gate and Hadamard Transform on a null/vacuum state (see Pseudo Code for operations)
    • The public and the private key are used to perform Hadamard transformation on the state produced in the previous step in order to generate the signature quantum state.
    • The Seller then performs some operation using her private key and measures the quantum state. It can be shown the states were one of the BB84 states and hence, can have one of the two possible bases (X basis, Z basis or + basis,x basis) and four possible states. She records the basis and classical bit representing the state obtained.
    • Seller then concatenates these classical bits, the two random string bits, and a timestamp unique to the signature. The concatenated classical string is used as the input of publicly chosen QOWF, to get the output called 'quantum digest'. She produces some copies of quantum digest for each recipient (buyer).
    • Seller then encrypts the timestamp and quantum output of QOWF with pre-shared common key via quantum vernam cipher. PKG unpads these and publicly announces for buyer's verification step.
    • Sellers sends the signature to the buyer which includes the signature quantum state, message, timestamp and basis states.
  • Verification: In this method, buyer checks the authenticity of the signature (whether the message has come from a genuine seller).
    • The buyer performs some quantum gates on the signature quantum state, using seller's public key and message. He measures the resulting quantum state, using basis states for each qubit sent in the signature. The result thus, obtained is represnted by a classical string, in the same way as done by seller.
    • The result should reveal the random string used by seller and hence, buyer can also generate the same number of copies of the quantum digest using the publicly known QOWF.
    • Buyer, thus, compares his outputs of QOWF with the ones sent by the seller using quantum SWAP Test. If the number of matches is greater than the accepted/decided threshold value, the signature is accepted else it is rejected.

Notation[edit]

  • : Total number of qubits of message.
  • : public function to obtain public key from user's email-id
  • : Seller's public key, where .
  • : Seller's private, where .
  • : Random OTP number selected by PKG to denote each of Seller's signatures, where .
  • : function VC performs one time pads 'y' using quantum pad key 'x' via Quantum Vernam Cipher (1), (2).
  • : Shared key between the Seller and PKG where .
  • : Quantum Vernam cipher encrypted state which uses .
  • : PKG's master key which is a one way function where .
  • : Public quantum one way function selected by Seller to generate quantum digest.
  • : Message sent by Seller to the Buyer, where .
  • : Random string of uniform distribution selected by the Seller, where .
  • : Random string of uniform distribution selected by the Seller, where .
  • : qubit address
  • : Quantum state which is defined by

  • : Quantum state which is defined by

  • : Signature quantum state for message which is the quantum state

  • : Private key quantum state where and it is the quantum state:

  • : Classical 2n-bit for -qubit where is encoded to 10, to 11, to 00 and is encoded to 01.
  • : This is the set of the basis of each qubit in .

  • : Measurement of qubit in basis
  • : measurement result of qubit in the concerned quantum state
  • : Quantum digital digest received by PKG.
  • : Quantum digital digest generated by Buyer.
  • : The most number of Buyer in this scheme.
  • : Safety parameter threshold for acceptance.
  • : Security threshold decided in advance.
  • : Number of times SWAP test is performed.
  • : A quantum state, where

This state is also expressed as where

  • : Classical bit string denoted as . It is proven that .
  • : g is a classical function which when takes classical 2n bit string Q, gives seller's random string t as output. This function can be calculated.
  • : , where .

Hardware Requirements[edit]

  • Network Stage:Prepare and Measure
  • The total number of qubits used in this protocol is equal to the total number of qubits in the message.
  • Secure quantum channel between seller and buyer

Knowledge Graph[edit]

Properties[edit]

  • This protocol cannot be broken even if the adversary had unlimited computing power.
  • In this protocol, it is proven that no adversary can break the secrecy of the seller's signature private key.
  • The quantum digital signature produced in this protocol is impossible to repudiate and cannot be forged in any condition.
  • In the protocol the public and the private key belonging to the classical bits, only the signature cipher has quantum nature.
  • No Certificate Authority is required to manage digital public-key certificate of sellers.
  • If , the measuring result occurs with probability 1, otherwise it occurs with probability . Hence, when repeated for times, the probability of equality is at least 1-.

Protocol Description[edit]

Stage 1 Key Distribution
Input: Seller and PKG ()
Output: Seller and PKG (); Everyone ()

  1. PKG generates Seller's email-id)
  2. PKG randomly chooses ,
  3. PKG calculates
  4. PKG encrypts
  5. Seller decrypts .

Stage 2.1 Messaging: Signature
Input: Seller (, , )
Output: PKG (), Buyer (Signature

  1. Seller randomly chooses and .
  2. , Seller operates
  3. , Seller generates
  4. , Seller generates
  5. For :
    1. Seller chooses
    2. Seller measures in basis
    3. If then
      1. If then else
    4. If then
      1. If then else
  6. For :
    1. For :
  7. Seller encrypts and sends to PKG
  8. PKG decrypts
  9. PKG announces publicly that the quantum digest is ready.
  10. Seller transmits Signature to buyer.

Stage 2.2 Messaging: Verification
Input: Buyer (Signature Failed to parse (Conversion error. Server ("https://wikimedia.org/api/rest_") reported: "Cannot get mml. Server problem."): {\displaystyle (ts,m,B,|S\rangle _{k_{pri},m})} , public key )
Output: Buyer accepts or rejects the signature

  1. Buyer operates: .
  2. For :
    1. Buyer measures in basis
    2. If then
      1. If then else
    3. If then
      1. If then else
  3. Buyer obtains
  4. Buyer receives from PKG.
  5. For :
    1. Buyer generates
    2. Buyer receives from PKG.
    3. Buyer performs SWAP test: QSWAP()
    4. If QSWAP=true, then
  6. If buyer accepts
  7. Else buyer rejects

Further Information[edit]

Like most other classical digital signature schemes which provide unconditional security, this scheme also requires a trusted arbitrator who distributes the public key to the recipients. This protocol was preceded by a few other protocols which use an arbitrator to establish quantum digital signatures, most of which used entangled states.

  1. Zeng and Keitel (2002)
  2. Wang et al (2005)
  3. Li et al (2009)
  4. Zhou and Qiu (2010)
  5. Guang et al (2011)
  6. Zou et al (2013)
  7. Wang et al (2014)
  8. Li et al (2017)

References[edit]

  1. BR (2000)
  2. Zhou et al. (2006)
*contributed by Rhea Parekh and Shraddha Singh