A geometric protocol for cryptography with cards

2016

Information Sciences

Self Cite

We study a general scenario where confidential information is distributed among a group of agents who wish to share it in such a way that the data becomes common knowledge among them but an eavesdropper intercepting their communications would be unable to obtain any of said data. The information is modelled as a deck of cards dealt among the agents, so that after the information is exchanged, all of the communicating agents must know the entire deal, but the eavesdropper must remain ignorant about who holds each card.Valentin Goranko and the author previously set up this scenario as the secure aggregation of distributed information problem and constructed weakly safe protocols, where given any card c, the eavesdropper does not know with certainty which agent holds c. Here we present a perfectly safe protocol, which does not alter the eavesdropper's perceived probability that any given agent holds c. In our protocol, one of the communicating agents holds a larger portion of the cards than the rest, but we show how for infinitely many values of a, the number of cards may be chosen so that each of the m agents holds more than a cards and less than 2m 2 a.

Section: Comparison To Known Resultsmentioning

confidence: 99%

“…Compare this to the protocol presented in[3], where it is Alice's hand that would form a line rather than its complement.…”

mentioning

confidence: 99%

Perfectly secure data aggregation via shifted projections

2016

Information Sciences

Self Cite

“…We will show the SADI problem for distribution type (3, 3, 1) is solvable, by informally describing the following solving protocol. It is a variation of a solution to the two-agent Russian cards problem, which appeared in [2] and, in a presentation closer to ours, in [4]. Alice 'places' all cards in the points of the 7-point projective plane, also known as the Fano plane, in such a way that her cards form a line, as indicated in Figure 1.…”

Section: Short Protocols For the Three-agent Casementioning

confidence: 88%

Secure aggregation of distributed information: How a team of agents can safely share secrets in front of a spy

Discrete Applied Mathematics

Goranko

2016

Self Cite

We consider the generic problem of Secure Aggregation of Distributed Information (SADI), where several agents acting as a team have information distributed amongst them, modelled by means of a publicly known deck of cards distributed amongst the agents, so that each of them knows only her cards. The agents have to exchange and aggregate the information about how the cards are distributed amongst them by means of public announcements over insecure communication channels, intercepted by an adversary "eavesdropper", in such a way that the adversary does not learn who holds any of the cards. We present a combinatorial construction of protocols that provides a direct solution of a class of SADI problems and develop a technique of iterated reduction of SADI problems to smaller ones which are

“…This strategy generalizes that in [2] where α = δ − 1, although that article also considers the case where Alice holds more than one plane. Let us now show that the strategy is equitable.…”

Section: The Geometric Strategymentioning

confidence: 99%

A case study in almost-perfect security for unconditionally secure communication

Landerreche

2016

Des. Codes Cryptogr.

Self Cite

In the Russian cards problem, Alice, Bob and Cath draw a, b and c cards, respectively, from a publicly known deck. Alice and Bob must then communicate their cards to each other without Cath learning who holds a single card. Solutions in the literature provide weak security, where Alice and Bob's exchanges do not allow Cath to know with certainty who holds each card that is not hers, or perfect security, where Cath learns no probabilistic information about who holds any given card. We propose an intermediate notion, which we call ε-strong security, where the probabilities perceived by Cath may only change by a factor of ε. We then show that a mild variant of the so-called geometric strategy gives ε-strong safety for arbitrarily small ε and appropriately chosen values of a, b, c. *