Talk:Comparative statics

Fair use rationale for Image:Pyat rublei 1997.jpg

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BetacommandBot 11:23, 6 July 2007 (UTC)

It's irrelevant anyway

Besides, what's the purpose of a picture of a ruble on the comparative statics page? --Rinconsoleao 12:47, 6 July 2007 (UTC)

Dubious assertion on cardinal vs. ordinal

At 02:00, 27 September 2010 the following was put in by an editor who has not edited since the end of 2010:

Another limitation is that results are cardinal rather than ordinal; that is, results are not robust to a monotone transformation of the objective function. For economic applications, ordinal results are preferred. In particular, monotone strictly increasing transformations of a utility function represent the same preference relation.

Paul Milgrom and Chris Shannon developed a theory and method for comparative statics analysis using only conditions that are ordinal. ^[1] The method uses lattice theory and introduces the notions of quasi-supermodularity and the single-crossing condition. The central theorem of monotone comparative statics is:

Suppose ${\displaystyle p:R^{n}\times R^{m}\rightarrow R}$ and let ${\displaystyle x^{*}(q)=\arg \max p(x;q)}$. Suppose ${\displaystyle |x^{*}(q)=1|\forall q}$, 'p' is quasi-supermodular in 'x' and satisfies the single-crossing property. Then

${\displaystyle q\geq r\implies x^{*}(q)\geq x^{*}(r).}$

The link to the source is dead.

I have two problems with this:

(1) The statement of the theorem is not accompanied by any verbal explanation, and I can't see why it's relevant in the absence of a lot more explanation.

(2) The assertion that results are cardinal rather than ordinal; that is, results are not robust to a monotone transformation of the objective function is just wrong, unless it's intended to mean something that I'm not catching. If you optimize a monotone increasing transformation of a utility function you'll get exactly the same first-order conditions as if you optimize the untransformed utility function, and so the comparative statics will be exactly the same.

Unless someone objects, I'm going to delete the above-quoted passage in a few days. Duoduoduo (talk) 19:40, 27 April 2012 (UTC)

References

1. Milgrom and Shannon. "Monotone Comparative Statics" (1994). Econometrica, Vol. 62 Issue 1, pp. 157-180, http://www.core.ucl.ac.be/clsAmir/MS1994.pdf.