A Note on Relaxed Divisor Methods
نویسنده
چکیده
The purpose of this note is to add some important properties to the results obtained in [2]. Specifically, it is shown that (i) an apportionment for relaxed divisor methods remains unchanged over an interval and (ii) any relaxed divisor method approaches the Webster method as the house size increases.
منابع مشابه
Relaxed Divisor Methods and Their Seat Biases
A class of methods of apportionment called the relaxed divisor methods is introduced here. It is theoretically shown that their biases between small and large states decrease and eventually approach zero as the house size increases. Because the methods of Hill and Webster are examples of the class, they both are practically unbiased for the house size large enough. However, computer simulations...
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