New Paradoxical Games Based on Brownian Ratchets

Parrondo, Juan M. R.; Harmer, Gregory P.; Abbott, Derek

doi:10.1103/physrevlett.85.5226

Cited by 238 publications

(236 citation statements)

References 28 publications

(43 reference statements)

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“…1 yield a situation where both games A and B are individually losing but the combination of A and B can produce a net positive payoff provided ǫ < 1/168 [24]. With the quantum version of the games the expectation value of the payoff (to O[ǫ]) for a single sequence of AAB can vary between 0.812 + 0.24ǫ and −0.812 + 0.03ǫ.…”

Section: Resultsmentioning

confidence: 99%

“…Winning and losing probabilities for game A and the history dependent game B from Parrondo, Harmer and Abbott [24].…”

Section: Resultsmentioning

confidence: 99%

“…In this, game A is the toss of a single biased coin while game B utilises two or more biased coins whose use depends on the game situation. The paradox requires a form of feedback, for example through the dependence on capital [23], through history dependent rules [24], or through spatial neighbour dependence [25]. In this paper game B is a history dependent game utilising four coins B 1 to B 4 as indicated in Fig.…”

Section: Introductionmentioning

confidence: 99%

“…The effect is named after its discoverer, Juan Parrondo [19,20], and can be mimiced in a physical system of a Brownian ratchet and pawl [21,22] which is apparently driven in one direction by the Brownian motion of surrounding particles. The classical Parrondo game is cast in the form of a gambling game utilising a set of biased coins [22,23,24]. In this, game A is the toss of a single biased coin while game B utilises two or more biased coins whose use depends on the game situation.…”

Section: Introductionmentioning

confidence: 99%

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Quantum Parrondo's games

Flitney

Abbott

2002

Physica A: Statistical Mechanics and its Applications

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Parrondo's Paradox arises when two losing games are combined to produce a winning one. A history dependent quantum Parrondo game is studied where the rotation operators that represent the toss of a classical biased coin are replaced by general SU (2) operators to transform the game into the quantum domain. In the initial state, a superposition of qubits can be used to couple the games and produce interference leading to quite different payoffs to those in the classical case.

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Section: Resultsmentioning

confidence: 99%

“…Winning and losing probabilities for game A and the history dependent game B from Parrondo, Harmer and Abbott [24].…”

Section: Resultsmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

See 2 more Smart Citations

Quantum Parrondo's games

Flitney

Abbott

2002

Physica A: Statistical Mechanics and its Applications

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“…Parrondo, Harmer and Abbott proposed a history-dependent game paradox [7] as an improvement of Parrondo's game [3]. Later on, the history-dependent game paradox was extended to couple two history-dependent games [8].…”

Section: Introductionmentioning

confidence: 99%

An optical model for implementing Parrondo’s game and designing stochastic game with long-term memory

2012

Chaos, Solitons & Fractals

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An optical model of classical photons propagating through array of many beam splitters is developed to give a physical analogy of Parrondo's game and Parrondo-Harmer-Abbott game. We showed both the two games are reasonable game without so-called game paradox and they are essentially the same. We designed the games with long-term memory on loop lattice and history-entangled game. The strong correlation between nearest two rounds of game can make the combination of two losing game win, lose or oscillate between win and loss. The periodic potential in Brownian ratchet is analogous to a long chain of beam splitters. The coupling between two neighboring potential wells is equivalent to two coupled beam splitters. This correspondence may help us to understand the anomalous motion of exceptional Brownian particles moving in the opposite direction to the majority. We designed the capital wave for a game by introducing correlations into independent capitals instead of sub-games. Playing entangled quantum states in many coupled classical games obey the same rules for manipulating quantum states in many body physics.

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Predator Dormancy is a Stable Adaptive Strategy due to Parrondo's Paradox

et al. 2019

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Many predators produce dormant offspring to escape harsh environmental conditions, but the evolutionary stability of this adaptation has not been fully explored. Like seed banks in plants, dormancy provides a stable competitive advantage when seasonal variations occur, because the persistence of dormant forms under harsh conditions compensates for the increased cost of producing dormant offspring. However, dormancy also exists in environments with minimal abiotic variation—an observation not accounted for by existing theory. Here it is demonstrated that dormancy can out‐compete perennial activity under conditions of extensive prey density fluctuation caused by overpredation. It is shown that at a critical level of prey density fluctuations, dormancy becomes an evolutionarily stable strategy. This is interpreted as a manifestation of Parrondo's paradox: although neither the active nor dormant forms of a dormancy‐capable predator can individually out‐compete a perennially active predator, alternating between these two losing strategies can paradoxically result in a winning strategy. Parrondo's paradox may thus explain the widespread success of quiescent behavioral strategies such as dormancy, suggesting that dormancy emerges as a natural evolutionary response to the self‐destructive tendencies of overpredation and related biological phenomena.

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New Paradoxical Games Based on Brownian Ratchets

Cited by 238 publications

References 28 publications

Quantum Parrondo's games

Quantum Parrondo's games

An optical model for implementing Parrondo’s game and designing stochastic game with long-term memory

Predator Dormancy is a Stable Adaptive Strategy due to Parrondo's Paradox

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