To clarify my position:<div><br></div><div>I think that, because of social dynamics which push voter groups towards symmetry (ie, B voters like A as much/little as A voters like B), honest condorcet cycles will be a fraction of what they would be in "impartial culture"-type models. Since such models usually give somewhere around 10% cycles, or a little more, I think honest cycles will be somewhere in the low single digits - 1%-4%. For this, I have little evidence, although it should be noted that Romania is not at all counter-evidence; one documented possibility in a large number of modern, polled elections is about what my proportion would have predicted. It is certainly not evidence against "most" cycles in a Condorcet system being due to truncation, as we have essentially 0 data on condorcet systems in public elections.</div>
<div><br></div><div>I think that the necessary conditions for truncation/burial to be a rational strategy will be much more common. It depends a lot on the average number of "serious" candidates per election, but assuming that with a Condorcet method that number would be somewhere between 2.5 and 5, with a minimum of 2... well, I don't want to pretend I've done the calculations, but my guess is that that would lead to somewhere between 20% to 60% of elections having a rational truncation which would affect the result. I'd imagine that a possible truncation would actually happen somewhere from 25% to 75% of the time. So honest cycles should be roughly 1%-4%, and truncated ones roughly 5%-45%. If these broad ranges are right, then truncated cycles will be 55%-98% of all cycles - probably 66%-90% - ie, "most". </div>
<div><br></div><div>This is why I think that system performance relating to truncation strategy is at least as important as honest performance, at least for decent systems where the differences between honest performance are not too large.</div>
<div><br></div><div>JQ<br><div class="gmail_quote">2010/7/14 Warren Smith <span dir="ltr"><<a href="mailto:warren.wds@gmail.com">warren.wds@gmail.com</a>></span><br><blockquote class="gmail_quote" style="margin:0 0 0 .8ex;border-left:1px #ccc solid;padding-left:1ex;">
> I believe that Jameson Quinn is right when he says that most Condorcet cycles are probably artificial,<br>
i.e. they are caused by strategic truncation or strategic burial.<br>
<br>
--For a real life example of a Condorcet cycle in a large national election, see<br>
<a href="http://rangevoting.org/Romania2009.html" target="_blank">http://rangevoting.org/Romania2009.html</a><br>
Contrary to Simmons' conjecture/intuition, this cycle seems to have<br>
been not "strategic," it was "honest" -- because the evidence for the<br>
cycle consists of pairwise-poll data, and there is no motivation for<br>
dishonesty in 2-man pairwise polls.<br>
<br>
Further, other real-world cycle examples (?) are noted, discussed 2nd<br>
half of section 4.<br>
<font color="#888888"><br>
--<br>
Warren D. Smith<br>
<a href="http://RangeVoting.org" target="_blank">http://RangeVoting.org</a> <-- add your endorsement (by clicking<br>
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and<br>
<a href="http://math.temple.edu/~wds/homepage/works.html" target="_blank">math.temple.edu/~wds/homepage/works.html</a><br>
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</div></div></blockquote></div><br></div>