| Quantum Key Distribution |
Article Index for Quantum |
Shopping Cryptography |
Website Links For Quantum |
Information AboutQuantum Key Distribution |
| CATEGORIES ABOUT QUANTUM CRYPTOGRAPHY | |
| cryptography | |
| quantum information science | |
|
QUANTUM KEY EXCHANGE A central problem in cryptography is the key distribution problem. One solution, that of public-key cryptography, relies on the computational difficulty of certain hard mathematical problems (such as integer factorisation), whereas quantum cryptography relies on the laws of Quantum Mechanics . Quantum cryptographic devices typically employ individual photons of light and take advantage of either the Heisenberg Uncertainty Principle or Quantum Entanglement . Uncertainty: The act of measurement is an integral part of quantum mechanics, not just a passive, external process as in classical physics. So it is possible to encode information into some quantum properties of a photon in such a way that any effort to monitor them necessarily disturbs them in some detectable way. The effect arises because in quantum theory, certain pairs of physical properties are complementary in the sense that measuring one property necessarily disturbs the other. This statement is known as the Heisenberg uncertainty principle. The two complementary properties that are often used in quantum cryptography, are two types of photon’s polarization, e.g. rectilinear (vertical and horizontal) and diagonal (at 45° and 135°). Entanglement: It is a state of two or more quantum particles, e.g. photons, in which many of their physical properties are strongly correlated. The entangled particles cannot be described by specifying the states of individual particles and they may together share information in a form which cannot be accessed in any experiment performed on either of the particles alone. This happens no matter how far apart the particles may be at the time. Two different approaches Based on these two counter-intuitive features of quantum mechanics (uncertainty and entanglement), two different types of quantum cryptographic protocols were invented. The first type uses the polarization of photons to encode the bits of information and relies on quantum randomness to keep Eve from learning the secret key. The second type uses entangled photon states to encode the bits and relies on the fact that the information defining the key only "comes into being" after measurements performed by Alice And Bob . Polarized photons - Charles H. Bennett and Gilles Brassard (1984) This cryptographic scheme uses pulses of polarized light, with one photon per pulse. Consider two types of polarization, linear and circular. Linear Polarization can be vertical or horizontal and Circular Polarization can be left-handed or right-handed. Any type of polarization of a single photon can encode one bit of information, for example, vertical polarization for "0" and horizontal polarization for "1" or left-handed polarization for "0" and right-handed polarization for "1". In order to generate a random key, Alice must send either horizontal or vertical polarization with equal probability. To keep Eve from successfully eavesdropping, Alice also uses randomly the alternative circular polarizations randomly choosing between left-handed and right-handed photons. The security of this scheme is based on the fact that Eve does not know whether any given pulse codes for 0 or 1 using the linear or the circular polarizations. If Eve tries to measure the state and guesses wrongly, she will disturb it, and Alice and Bob can monitor for such disturbances to test for possible eavesdropping and even estimate what fraction of the transmitted key Eve might have obtained. Bob does not know which polarizations were used for any given pulse coding either. (Alice could tell him, but since it has to be kept secret from Eve they would need a cryptographically secure communication channel to do this, and if they had one they wouldn't need this scheme.) However, he can guess, and half the time he will get it right. Once the photons are safely received, so that Eve cannot use the information, Alice can tell him which guesses were right and which wrong. Entangled photons - Artur Ekert (1991) The Ekert scheme uses entangled pairs of photons. These can be made by Alice, by Bob, or by some source separate from both of them, including eavesdropper Eve, although the problem of certifying them will arise. In any case, the photons are distributed so that Alice and Bob each end up with one photon from each pair. The scheme relies on three properties of entanglement. First, we can make entangled states which are perfectly correlated in the sense that if Alice and Bob both test whether their particles have vertical or horizontal polarizations, they will always get opposite answers. The same is true if they both measure any other pair of complementary (orthogonal) polarizations. However, their individual results are completely random: it is impossible for Alice to predict if she will get vertical polarization or horizontal polarization. Second, these states have a property often called quantum non-locality, which has no analogue in classical physics. If Alice and Bob carry out polarization measurements, their answers will not be perfectly correlated, but they will be somewhat correlated. That is, there is an above-50% probability that Alice can, from her measurement, correctly deduce Bob's measurement, and vice versa. And these correlations are stronger - Alice's guesses will on average be better - than any model based on classical physics or ordinary intuition would predict. Third, any attempt at eavesdropping by Eve will weaken these correlations, in a way that Alice and Bob can detect. Privacy amplification Quantum cryptography protocols achieve something that ordinary classical cryptography cannot. They allow Alice and Bob to generate and share random keys which are very similar - in perfect conditions they would be identical, but actually there will be some error rate. They also allow Alice and Bob to estimate the level of eavesdropping and so work out the maximum amount of information Eve can have about their shared random keys. These are interesting results, but on their own they are not enough to solve the key distribution problem. It could be disastrous if Eve learns even a small part of the cryptographic key: she could then read part - perhaps a critical part - of the secret message Alice wants to send. Because errors and background noise can never completely be avoided, Alice and Bob can never guarantee that Eve has no information at all about their keys - communication errors and eavesdropping cannot be distinguished, and so to be on the safe side Alice and Bob have to assume that all discrepancies are due to Eve. Privacy amplification is a sort of cryptographic version of error correction, which allows Alice and Bob to start with similar shared random keys about which Eve has some information and make shorter shared random keys which are identical and about which Eve has (essentially) no information. Though classical privacy amplification can be used for either the Bennett-Brassard or the Ekert protocols, it turns out that entanglement-based cryptography allows privacy amplification to be carried out directly at the quantum level. This is more efficient, and has other advantages. In particular, when the technology is fully developed, it will allow quantum cryptography to be carried out over arbitrarily long distances by using quantum repeater stations along the communication route. Attacks In Quantum Cryptography, traditional Man-in-the-middle Attack s are impossible due to Heisenberg's uncertainty principle. If Mallory attempts to intercept the stream of photons, he will inevitably alter them if he uses an incorrect detector. He cannot re-emit the photons to Bob correctly, which will introduce unacceptable levels of error into the communication. If Alice and Bob are using an entangled photon system, then it is virtually impossible to hijack these, because creating three entangled photons would decrease the strength of each photon to such a degree that it would be easily detected. Mallory cannot use a man-in-the-middle attack, since he would have to measure an entangled photon and disrupt the other photon, then he would have to re-emit both photons. This is impossible to do, by the laws of quantum physics. Because a dedicated fiber optic line is required between the two points linked by quantum cryptography, a Denial Of Service Attack can be mounted by simply cutting the line or, perhaps more surreptitiously, by attempting to tap it. If the equipment used in quantum cryptography can be tampered with, it could be made to generate keys that were not secure using a Random Number Generator Attack . Quantum cryptography is still vulnerable to a type of MITM where the interceptor (Eve) establishes herself as "Alice" to Bob, and as "Bob" to Alice. Then, Eve simply has to perform QC negotiations on both sides simultaneously, obtaining two different keys. Alice-side key is used to decrypt the incoming message, which is reencrypted using the Bob-side key. This attack fails if both sides can verify each other's identity. History Quantum cryptography was proposed first by , of the IBM T.J. Watson Research Center, and Gilles Brassard , of the Université de Montréal, proposed a method for secure communication based on Wiesner’s “conjugate observables”. In 1990, independently and initially unaware of the earlier work, Artur Ekert , then a Ph.D. student at the University of Oxford, developed a different approach to quantum cryptography based on peculiar quantum correlations known as quantum entanglement. PROSPECTS Entangled quantum states are rarely stable long enough for practical applications. The first commercial applications of quantum cryptography have thus a limited reach (100 kilometers maximum). Research is done into Satellite transmission of the quantum states, since outside the atmosphere, there would be considerably less perturbating interactions.
SEE ALSO
EXTERNAL LINKS
|
|
|