1 |
Reed, F. (2007). Two-locus epistasis with sexually antagonistic selection: A genetic Parrondo's paradox, Genetics, 176, 1923-1929.
DOI
ScienceOn
|
2 |
Spurgin, R. and Tamarkin, M. (2005). Switching investments can be a bad idea when Parrondo's paradox applies, Journal of Behavioral Finance, 15-18.
|
3 |
Stjernberg, F. (2007). Parrondo's paradox and epistemology when bad things happen to good cognizers (and conversely). In: Rnnow-Rasmussen, T. and Petersson, B., Josefsson, J., and Egonsson, D. (eds.) Hommage a Wlodek. Philosophical Papers Dedicated to Wlodek Rabinowicz.
|
4 |
Boman, M., Johansson, S. J. and Lyback, D. (2001). Parrondo strategies for artificial traders. In: Zhong, N., Liu, J., Ohsuga, S., and Bradshaw, J. (eds.) Intelligent Agent Technology: Research and Development, World Scientific, Singapore, 150-159.
|
5 |
Di Crescenzo, A. (2007). A Parrondo paradox in reliability theory, Mathematical Scientist, 32, 17-22.
|
6 |
Ethier, S. N. and Lee, J. (2009). Limit theorems for Parrondo's paradox, Electronic Journal of Probability, 14, 1827-1862.
DOI
|
7 |
Ethier, S. N. and Lee, J. (2010). A Markovian slot machine and Parrondo's paradox, Annals of Applied Probability, 20, 1098-1125.
DOI
|
8 |
Harmer, G. P. and Abbott, D. (2002). A review of Parrondo's paradox, Fluctuation and Noise Letters, R71-R107.
|
9 |
Iyengar, R. and Kohli, R. (2004). Why Parrando's paradox is irrelevant for utility theory, stock buying, and the emergence of life, Essays & Commentaries, 20, 595-601.
|
10 |
Kemeny, J. G. and Snell, J. L. (1960). Finite Markov Chains, D. Van Nostrand Company, Inc., Princeton, NJ.
|
11 |
Key, E. S. (1987). Computable examples of the maximal Lyapunov exponent, Probability Theory and Related Fields, 75, 97-107.
DOI
|
12 |
Bishop, C. M. (1996). Neural Networks for Pattern Recognition, Oxford Press, Chapter 9, 346-349.
|
13 |
Osipovitch, D. C., Barratt, C. and Schwartz, P. M. (2009). Systems chemistry and Parrondos paradox: Computational models of thermal cycling, New Journal of Chemistry, 33, 2022-2027.
DOI
ScienceOn
|
14 |
Parrondo, J. M. R., Harmer, G. P. and Abbott, D. (2000) New paradoxical games based on Brownian ratchets, Physical Review Letters, 85, 5226-5229.
DOI
ScienceOn
|
15 |
Pinsky, R. and Scheutzow, M. (1992). Some remarks and examples concerning the transient and recurrence of random diffusions, Annales de l'Institut Henri Poincare-Probabilites et Statistiques, 28, 519-536.
|
16 |
Abbott, D. (2010). Asymmetry and disorder: A decade of Parrondo's paradox, Fluctuation and Noise Letters, 129-156.
|