Team:Paris/Modeling/BOB/Akaike
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<center><html><div style="color:#275D96; font-size:2em;">Model Comparison</div></html></center> | <center><html><div style="color:#275D96; font-size:2em;">Model Comparison</div></html></center> | ||
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- | * Using linear equations in a biological system might seem awkards. However, we wanted to check the relevance of this approach. We have been looking for a criterium that would penalize a system that had many parameters, but that would also penalize a system which quadratic error would be too important while fitting experimental values. The goal here is to decide whether, assuming that the experimental data looks like a model based on Hill functions, the linear model is obsolete or not. | + | * Using linear equations in a biological system might seem awkards. However, we wanted to check the relevance of this approach. We have been looking for a criterium that would penalize a system that had many parameters, but that would also penalize a system which quadratic error would be too important while fitting experimental values. The goal here is to decide whether, assuming that the experimental data looks like a model based on Hill functions, the linear part of the BOB model is obsolete or not. |
* Akaike and Schwarz criteria taken from the information theory met our demands quite well : | * Akaike and Schwarz criteria taken from the information theory met our demands quite well : | ||
Akaike criterion : [[Image:AIC.jpg|center]] | Akaike criterion : [[Image:AIC.jpg|center]] |
Revision as of 12:49, 3 September 2008
(Under Construction) Model Comparison
where n denotes the number of experimental values, k the number of parameters and RSS the residual sum of squares. The best fitting model is the one for which those criteria are minimized.
System#1 : using the linear equations from our BOB approach : System#2 : using classical Hill functions :
We mostly used the definition of the criteria given in : [http://www.liebertonline.com/doi/pdf/10.1089/rej.2006.9.324 K. Kikkawa.Statistical issue of regression analysis on development of an age predictive equation. Rejuvenation research, Volume 9, n°2, 2006.] |