Pinelis I (2003) Evolutionary models of phylogenetic trees. Oxford University Press, Oxford, pp 384–412 Mossel E, Steel M (2005) How much can evolved characters tell us about the tree that generated them? In: Gascuel O (ed) Mathematics of evolution and phylogeny. Mossel E (2003) On the impossibility of reconstructing ancestral data and phylogenies. Mossel E (1998) Recursive reconstruction on periodic trees. Kemeny JG, Snell JL (1976) Finite Markov chains. Cambridge University Press, Cambridge, UK Häggström O (2002) Finite Markov chains and algorithmic applications. Grimmett G, Stirzaker D (2001) Probability and random processes, 3rd edn. Sinauer Associates, Sunderland, MAįischer M, Thatte B (2009) Maximum parsimony on subsets of taxa. Adv Appl Probab 10:403–433įelsenstein J (2004) Inferring phylogenies. Springer-Verlag, New YorkĮvans W, Kenyon C, Peres Y, Schulman LJ (2000) Broadcasting on trees and the Ising model. Burgess Publishing Company, Minneapolisĭurrett R (2002) Probability models for DNA sequence evolution. Wiley, New YorkĬrow J, Kimura M (1970) An introduction to population genetics theory. Math Biosci 134:189–215Ĭover TM, Thomas JA (1991) Elements of information theory. University of Chicago Press, ChicagoĬhang J (1996) Inconsistency of evolutionary tree topology reconstruction methods when substitution rates vary across characters. Springer Series in Statistics, Springer-Verlag, Berlinīrooks D, Wiley E (1988) Evolution as entropy. Cambridge University Press, Cambridge, UK, pp 230–258īerger JO (1985) Statistical decision theory and Bayesian analysis, 2nd edn. Br J Philos Sci 45:941–953īarrett M, Sober E (1995) When and why does entropy increase? In: Savitt S (ed) Time’s arrow today. Barrett M, Sober E (1994) The second law of probability dynamics.
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