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	<entry>
		<id>https://en.xen.wiki/index.php?title=Talk:Tp_tuning/WikispacesArchive&amp;diff=35006&amp;oldid=prev</id>
		<title>Mike Battaglia: 1 revision imported: Moving archived Wikispaces discussion to subpage</title>
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		<updated>2018-10-01T18:01:49Z</updated>

		<summary type="html">&lt;p&gt;1 revision imported: Moving archived Wikispaces discussion to subpage&lt;/p&gt;
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				&lt;td colspan=&quot;1&quot; style=&quot;background-color: #fff; color: #202122; text-align: center;&quot;&gt;Revision as of 18:01, 1 October 2018&lt;/td&gt;
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		<author><name>Mike Battaglia</name></author>
	</entry>
	<entry>
		<id>https://en.xen.wiki/index.php?title=Talk:Tp_tuning/WikispacesArchive&amp;diff=35005&amp;oldid=prev</id>
		<title>Wikispaces&gt;FREEZE at 18:01, 1 October 2018</title>
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		<updated>2018-10-01T18:01:16Z</updated>

		<summary type="html">&lt;p&gt;&lt;/p&gt;
&lt;p&gt;&lt;b&gt;New page&lt;/b&gt;&lt;/p&gt;&lt;div&gt;{{WSArchiveHeader}}&lt;br /&gt;
&lt;br /&gt;
&lt;br /&gt;
== proof sketch ==&lt;br /&gt;
I don&amp;#039;t really grok this sentence:&lt;br /&gt;
&lt;br /&gt;
&amp;quot;||Ƹ||, the norm of the full p-limit error map, must also be minimal among all valid error maps for S*, or the restriction of Ƹ to G would improve on Ɛ.&amp;quot;&lt;br /&gt;
&lt;br /&gt;
What can I do to convince myself of this? Or does it need to be rephrased?&lt;br /&gt;
&lt;br /&gt;
- &amp;#039;&amp;#039;&amp;#039;clumma&amp;#039;&amp;#039;&amp;#039; July 31, 2012, 01:05:37 AM UTC-0700&lt;br /&gt;
----&lt;br /&gt;
Let&amp;#039;s say that V is the space of monzos and V* is the space of vals, and that S is the subspace of smonzos and S* is the dual space of svals. Note that in the article, &amp;quot;S&amp;quot; referred to a temperament, so this is a different notation I&amp;#039;m using here.&lt;br /&gt;
&lt;br /&gt;
If we place a norm on V, this induces a norm on S, and the unit sphere of S is going to be the intersection of the unit sphere of V and the subspace defined by S. Since this is still a norm, we can define a dual norm on S*, which will by definition have all of the properties we like about dual norms (e.g. tells us the max weighted over all intervals for some tuning map). So S* is what we want, and our goal is to find some way to figure out what this dual norm for S* is.&lt;br /&gt;
&lt;br /&gt;
There is a V-map M going from V* -&amp;amp;gt; S*. The kernel of M is going to be the subspace of vals which is &amp;quot;tempered out&amp;quot; or made irrelevant when restricted to the subgroup S. The corollary to Hahn-Banach which is linked to shows that the norm on S* is actually the same as the quotient norm V*/ker(M), where ker(M) is that subspace of &amp;quot;invariant vals&amp;quot; I mentioned before. The quotient norm by definition is the norm of the smallest vector in the coset of vectors all mapping to the same thing.&lt;br /&gt;
&lt;br /&gt;
In short, what this all means is that for any sval s, we can find the norm ||s|| in two steps:&lt;br /&gt;
&lt;br /&gt;
1) Look at all of the full-limit vals in the equivalence class which map to s&lt;br /&gt;
&lt;br /&gt;
2) Find the val v in this equivalence class with lowest norm&lt;br /&gt;
&lt;br /&gt;
and then ||s|| = ||v||, by definition. Hahn-Banach shows that this also works out to be the dual norm to the norm defined on V, so that for some arbitrary subgroup tuning map t, ||t|| also has the added benefit of telling us the max norm-weighted error over all intervals in S. So it&amp;#039;s all the same and works out very neatly.&lt;br /&gt;
&lt;br /&gt;
Now then, as for the thing you asked:&lt;br /&gt;
&lt;br /&gt;
Assume that Ɛ is the error map in S* with shortest norm for the subgroup temperament T we care about, and that Ƹ is the full-limit error map in V* with shortest norm in the coset of error maps that get sent to Ɛ under the V-map M. Then, by definition, ||Ɛ|| = ||Ƹ||, which follows from the definition of quotient norm above.&lt;br /&gt;
&lt;br /&gt;
Note that the preimage under M of the set of all error maps supporting T is going to be an even larger set of error maps. Then for any full-limit error map e which is in this preimage, ||e|| &amp;amp;gt;= ||Ƹ||.&lt;br /&gt;
&lt;br /&gt;
Proof by contradiction: Assume some other full-limit error map X exists which is actually the minimal error map, and for which ||X|| &amp;amp;lt;= ||e|| for every e in the preimage, including Ƹ. Then since there&amp;#039;s a V-map M sending error maps in V* to error maps in S*, the subgroup error map M(X), given by the matrix multiplication X*M, would have to have a norm ||M(X)||  &amp;lt;h1 id=&amp;quot;toc0&amp;quot;&amp;gt; ||X||. This is because ||X|| has to be equal to the norm of the shortest error map that gets mapped to it, which in this case is M(X). Therefore, since ||X|| &amp;amp;lt; ||Ƹ||, and ||M(X)|| &amp;lt;/h1&amp;gt;&lt;br /&gt;
 ||X|| and ||Ɛ|| = ||Ƹ||, it must also be true that ||M(X)|| &amp;amp;lt; ||Ɛ||. But, this contradicts our initial assumption that ||Ɛ|| is the error map in S* with the shortest norm.&lt;br /&gt;
&lt;br /&gt;
TL;DR, if there were a better full-limit error map than Ƹ, it&amp;#039;d have to map to a better subgroup error map than Ɛ, but that&amp;#039;s a contradiction.&lt;br /&gt;
&lt;br /&gt;
- &amp;#039;&amp;#039;&amp;#039;mbattaglia1&amp;#039;&amp;#039;&amp;#039; July 31, 2012, 06:35:22 AM UTC-0700&lt;br /&gt;
----&lt;br /&gt;
wtf, I dunno what the hell happened. Here&amp;#039;s the last paragraph again:&lt;br /&gt;
&lt;br /&gt;
Proof by contradiction: Assume some other full-limit error map X exists which is actually the minimal error map, and for which ||X|| &amp;amp;lt;= ||e|| for every e in the preimage, including Ƹ. Then since there&amp;#039;s a V-map M sending error maps in V* to error maps in S*, the subgroup error map M(X), given by the matrix multiplication X*M, would have to have a norm ||M(X)|| = ||X||. This is because ||X|| has to be equal to the norm of the shortest error map that gets mapped to it, which in this case is M(X).&lt;br /&gt;
&lt;br /&gt;
Therefore, since&lt;br /&gt;
&lt;br /&gt;
||X|| &amp;amp;lt; ||Ƹ||, and&lt;br /&gt;
&lt;br /&gt;
||M(X)|| = ||X||, and&lt;br /&gt;
&lt;br /&gt;
||Ɛ|| = ||Ƹ||,&lt;br /&gt;
&lt;br /&gt;
it must also be true that ||M(X)|| &amp;amp;lt; ||Ɛ||. But, this contradicts our initial assumption that ||Ɛ|| is the error map in S* with the shortest norm.&lt;br /&gt;
&lt;br /&gt;
I guess I have to put it on separate lines, or it thinks things between equals signs are headers, =like this=.&lt;br /&gt;
&lt;br /&gt;
- &amp;#039;&amp;#039;&amp;#039;mbattaglia1&amp;#039;&amp;#039;&amp;#039; July 31, 2012, 06:37:11 AM UTC-0700&lt;br /&gt;
----&lt;br /&gt;
No, I guess not. Well, I dunno wtf went wrong, but there it is.&lt;br /&gt;
&lt;br /&gt;
- &amp;#039;&amp;#039;&amp;#039;mbattaglia1&amp;#039;&amp;#039;&amp;#039; July 31, 2012, 06:37:32 AM UTC-0700&lt;br /&gt;
----&lt;/div&gt;</summary>
		<author><name>Wikispaces&gt;FREEZE</name></author>
	</entry>
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