Sometimes referred to as the Fisher–Orr model, Fisher's model addresses the problem of adaptation (and, to some extent, complexity), and continues to be a point of reference in contemporary research on the genetic and evolutionary consequences of pleiotropy.[3]
The model has two forms, a geometric formalism, and a microscope analogy. A microscope which has many knobs to adjust the lenses to obtain a sharp image has little chance of obtaining an optimally functioning image by randomly turning the knobs. The chances of a clear image are not so bad if the number of knobs is low, but the chances will decrease dramatically if the number of adjustable parameters (knobs) is larger than two or three. Fisher introduced a geometric metaphor, which eventually became known as Fisher's geometric model.[3][1]
In his model, Fisher argues that the functioning of the microscope is analogous to the fitness of an organism. The performance of the microscope depends on the state of various knobs that can be manipulated, corresponding to distances and orientations of various lenses, whereas the fitness of an organism depends on the state of various phenotypic character such as body size and beak length and depth. The increase in the fitness of an organism by random changes is then analogous to the attempt to improve the performance of a microscope through randomly changing the positions of the knobs on the microscope.
The analogy between the microscope and an evolving organism can be formalized by representing the phenotype of an organism as a point in a high-dimensional data space, where the dimensions of that space correspond to the traits of the organism. The more independent dimensions of variation the phenotype has, the more difficult is improvement resulting from random changes. If there are many different ways to change a phenotype it becomes very unlikely that a random change affects the right combination of traits in the right way to improve fitness. Fisher noted that the smaller the effect, the higher the chance that a change is beneficial. At one extreme, changes with infinitesimally small effect have a 50% chance of improving fitness. This argument led to the widely held position that evolution proceeds by small mutations.
Furthermore, Orr discovered that both the fixation probability of a beneficial mutation and the fitness gain that is conferred by the fixation of the beneficial mutation decrease with organismal complexity.[4] Thus, the predicted rate of adaptation decreases quickly with the rise in organismal complexity, a theoretical finding known as the ‘cost of complexity’.
^Orr, Allen (2005). "The genetic theory of adaptation: a brief history" (PDF). Nature Reviews Genetics. 6 (2): 119–127. doi:10.1038/nrg1523. PMID 15716908. S2CID 17772950.
^ abWagner, Günter P.; Zhang, Jianzhi (March 2011), "The pleiotropic structure of the genotype–phenotype map: the evolvability of complex organisms" (PDF), Nature Reviews Genetics, 12 (3): 204–213, doi:10.1038/nrg2949, PMID 21331091, S2CID 8612268
^Orr, H. A. (2000), "Adaptation and the cost of complexity", Evolution, 54 (1): 13–20, doi:10.1111/j.0014-3820.2000.tb00002.x, PMID 10937178, S2CID 20895396
October 27, 2023
fisher, geometric, model, evolutionary, model, effect, sizes, effect, fitness, spontaneous, mutations, proposed, ronald, fisher, explain, distribution, effects, mutations, that, could, contribute, adaptative, evolution, conceptualization, editsometimes, referr. Fisher s geometric model FGM is an evolutionary model of the effect sizes and effect on fitness of spontaneous mutations 1 proposed by Ronald Fisher to explain the distribution of effects of mutations that could contribute to adaptative evolution 2 Conceptualization editSometimes referred to as the Fisher Orr model Fisher s model addresses the problem of adaptation and to some extent complexity and continues to be a point of reference in contemporary research on the genetic and evolutionary consequences of pleiotropy 3 The model has two forms a geometric formalism and a microscope analogy A microscope which has many knobs to adjust the lenses to obtain a sharp image has little chance of obtaining an optimally functioning image by randomly turning the knobs The chances of a clear image are not so bad if the number of knobs is low but the chances will decrease dramatically if the number of adjustable parameters knobs is larger than two or three Fisher introduced a geometric metaphor which eventually became known as Fisher s geometric model 3 1 In his model Fisher argues that the functioning of the microscope is analogous to the fitness of an organism The performance of the microscope depends on the state of various knobs that can be manipulated corresponding to distances and orientations of various lenses whereas the fitness of an organism depends on the state of various phenotypic character such as body size and beak length and depth The increase in the fitness of an organism by random changes is then analogous to the attempt to improve the performance of a microscope through randomly changing the positions of the knobs on the microscope The analogy between the microscope and an evolving organism can be formalized by representing the phenotype of an organism as a point in a high dimensional data space where the dimensions of that space correspond to the traits of the organism The more independent dimensions of variation the phenotype has the more difficult is improvement resulting from random changes If there are many different ways to change a phenotype it becomes very unlikely that a random change affects the right combination of traits in the right way to improve fitness Fisher noted that the smaller the effect the higher the chance that a change is beneficial At one extreme changes with infinitesimally small effect have a 50 chance of improving fitness This argument led to the widely held position that evolution proceeds by small mutations Furthermore Orr discovered that both the fixation probability of a beneficial mutation and the fitness gain that is conferred by the fixation of the beneficial mutation decrease with organismal complexity 4 Thus the predicted rate of adaptation decreases quickly with the rise in organismal complexity a theoretical finding known as the cost of complexity References edit a b Fisher Ronald 1930 The Genetical Theory of Natural Selection Oxford UK Oxford University Press Orr Allen 2005 The genetic theory of adaptation a brief history PDF Nature Reviews Genetics 6 2 119 127 doi 10 1038 nrg1523 PMID 15716908 S2CID 17772950 a b Wagner Gunter P Zhang Jianzhi March 2011 The pleiotropic structure of the genotype phenotype map the evolvability of complex organisms PDF Nature Reviews Genetics 12 3 204 213 doi 10 1038 nrg2949 PMID 21331091 S2CID 8612268 Orr H A 2000 Adaptation and the cost of complexity Evolution 54 1 13 20 doi 10 1111 j 0014 3820 2000 tb00002 x PMID 10937178 S2CID 20895396 Retrieved from https en wikipedia org w index php title Fisher 27s geometric model amp oldid 994391038, wikipedia, wiki, book, books, library,
