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This makes Chapter 3 my favorite chapter: it is chock full of goodies with lots of interesting variations of the original problem, and thus even more interesting models. Some may be far more applicable. For example, if you get to play the cad and can keep potential mates 'stockpiled,' then, by stockpiling seven potential mates, there's a strategy that you can use to increase the odds of finding the best one to 96% or so! Or, in another variation of the model, whose solution she refers to as the "twelve bonk rule," there's a result that says that if you simply want to ensure that your choice is better than 90% of the other choices available, simply 'sample' the first 12 possibilities and pick the first person who is better after the first 12. This strategy gives you a 77% possibility of success. ÏÔÈ»ÎÒ²»ÄÜÔÚÕâÀïÇ×÷ÕßÊéÖÐËù¾ÙµÄÀý×Ó£¬¹ØÓÚËýÊéÖÐÓÐȤµÄÀý×Ӻ͹۲ìÔÚÏÂÎÄÖÐÓÐÒ»¸ö¼òµ¥µÄÃèÊö£º µÚÒ»Õ "°®¡¢ÌðÃ۵İ®" Ìá³öÁË´óÁ¿µÄÄÜÒýÆðϲ°®ºÍÔ÷¶ñµÄÎÊÌ⣬À´Ô´ÓÚ "²¶Ê³-±»²¶Ê³Ä£ÐÍ." ÀýÈ磬ËýÌáµ½ÁËÏÂÁÐÄ£Ð͵ÄÆðÔ´£º ¡°ÂÞÃÜÅ·Ô½°®ÖìÀöÒ¶£¬ÖìÀöÒ¶Ô½ÏëÌÓÅÜ¡¡ÂÞÃÜŷʧÍûÁË£¬´òÍËÌùģ¬ÖìÀöÒ¶·¢ÏÖËûÆæ¹ÖµÄÎüÒýÁ¦£¬ÂÞÃÜÅ·»ØÓ¦Ëý¡¡¡± This model gives rise to a standard and very simple first order differential equation. She then talks about more sophisticated versions of this model including one by Rinaldi that tries to model a famous love poem by Petrarch. (Personally, I think these models are only useful for learning differential equations but don't shed much light on the problem.) µÚ¶þÕ "»éÒöºÍÐÒ¸£" and describes models for behavior in a relationship, including an analysis of how absurd the folk tale is that more ###### occurs in the first year of marriage then in all subsequent years combined. Probably the most interesting work she talks about in this chapter are the models by Guttman et al. intended to analyze conversations between lovers to determine if the relationship is on the rocks. In this case the models they build are known to be highly accurate in predicting problems in the relationship. µÚËÄÕ "Ô¼»á·þÎñ¡ªÄãÕæµÄ±»·þÎñÁËÂð?" and it has a fascinating analysis of the perils of questionnaires that try to match too many variables (i.e. why those questionnaires don't help that much). As she points out, this is called the "curse of dimensionality" in the literature. The problem is that if you are trying to determine whether two points are very close in n-dimensional space where n is large, you are unlikely to get a whole lot of difference between points and so closeness doesn't really matter much. µÚÎåÕ "Åä¶Ô" and shows how Game Theory can (should?) enter into the problem of "choice" preferences. This chapter is a very nice gateway into models that are studied in the greatest depth in economics; there is an incredibly interesting literature on these issues. One should start with Arrow's paradox on voting (that most logical axiom systems for building choice models are actually inconsistent and can't simultaneously be satisfied) and then work up to real problems with how congressional seats are allocated in the United States. Wikipedia has good articles to start with on these models. µÚÁùÕ "×÷ÓÃÓë·´×÷ÓÃ" and is about ways to model people's attractiveness. This means things like symmetry as a cross cultural model for beauty, and waist-to-hip ratio for females as a cross-cultural model for male choice. Whether these models are correct is an extremely active area of research in anthropology and evolutionary psychology. The jury seems to still be out, but the evidence for their truth is certainly growing. µÚÆßÕ "ÐÔ" and is a tantalizing hint of what the mathematics of evolution is all about. In particular this chapter includes a nice discussion of how ###### itself can evolve. (It seems paradoxical that the question of how ###### itself can evolve is not yet resolved. After all, in a naive "selfish gene" approach to evolution, it would seem seem that asexual methods of reproduction win hands down. But, as usual, the issues are more complex then naive models would predict. For example, who would have thought that parasites might be the reason ###### arose? Again, for more details on the science behind the models the author discusses, you can start with a useful Wikipedia article. Ridley's popular science book called the Red Queen (or anything by Maynard Smith) is where to go next. µÚ°ËÕ "How Ovaries Count and Balls Add Up," and is about models for feedback levels of hormone concentration and circadian rhythms and didn't particular interest me. ×îºóÒ»Õ "¸ß³±" ÎÒ²»ÄÜÓÃÒ»¾ä»°¸ÅÀ¨ To sum up, is this book perfect? No. I think more mathematically literate people would like appendices which give some indication of the deeper math behind what she discusses. For example, the math that shows why the answer I gave above to the Sultan's choice problem really is approximately 36.787944117144235 - or more correctly n/e, where e is the base of natural logarithms and n is the number of choices one has to go through, is well within the reach of any 2nd year calculus student. The differential equations she introduces in other chapters can be understood by anyone with a good engineering or math background. The game theory and even a proof of Arrow's theorem should be accessible to any literate person etc. As is, though, anyone with even some knowledge of or interest in mathematics will find this book great fun. |
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liverangel
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