报告题目:A Quantitative genetic model for growth, shape,reaction, norms, and other infinite-dimensional characteristic.
报告人:马訾伟 博士
Abstract:Infinite-dimensional characters are those in which the phenotype of an individual is described by a function, rather than by a finite set of measurements. Examples include growth trajectories, morphological shapes, and norms of reaction. Methods are presented here that allow individual phenotypes, population means, and patterns of variance and covariance to be quantified for infinite-dimensional characters. A quantitative-genetic model is developed, and the recursion equation for the evolution of the population mean phenotype of an infinite-dimensional character is derived. The infinite-dimensional method offers three advantages over conventional finite-dimensional methods when applied to this kind of trait: (1) it describes the trait at all points rather than at a finite number of landmarks, (2) it eliminates errors in predicting the evolutionary response to selection made by conventional methods because they neglect the effects of selection on some parts of the trait, and (3) it estimates parameters of interest more efficiently.
报告地点:72886必赢三楼数学实验室(西侧)
报告时间:2011年12月11日下午3:30
组织者:郑立飞 所属研究所:72886必赢应用数学研究所
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72886必赢
2011年12月9日