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Directory:Jon Awbrey/Essays/Prospects For Inquiry Driven Systems (view source)

Revision as of 14:38, 22 January 2008

212 bytes added , 14:38, 22 January 2008

→‎Logical Tangent Vectors: markup

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Discuss variation in portrayal of ''v'' in d''f''(''u'', ''v''):

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* as ordinary vector in second component of product space '''B'''''n'' × '''B'''''n'',~~~~

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:{| cellpadding="4"

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| 1.

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* as tangent vector map : ('''B'''''n'' → '''B''') → '''B''', dual to '''B'''''n'' ?~~~~

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| as ordinary vector in second component of product space '''B'''''n'' × '''B'''''n'',

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|-

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* as tangent vector map : ('''D'''''n'' → '''B''') → '''B''', dual to '''D'''''n'' ?~~~~

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| 2.

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| as tangent vector map : ('''B'''''n'' → '''B''') → '''B''', dual to '''B'''''n'' ?

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|-

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| 3.

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| as tangent vector map : ('''D'''''n'' → '''B''') → '''B''', dual to '''D'''''n'' ?

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|}

Discuss differential as map : T(''U'') = ''U''T → '''B'''.

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It helps to introduce some notation:

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~~<pre>~~

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:{| cellpadding="4"

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Let R = {real values}

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| Let

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| '''R'''

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Let B = {boolean values} = {0, 1} = {false, true}.

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| =

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| {real values}

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Let X = Rn, f: ~~Rn -~~> R.

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|  

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|-

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Let U = Bn, p: ~~Bn -~~> B.

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| Let

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~~</pre>~~

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| '''B'''

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| =

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| {boolean values}

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| = {0, 1} = {false, true}.

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|-

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| Let

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| ''X''

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| =

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| '''R'''''n'',

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| ''f'' : '''R'''''n'' → '''R'''.

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|-

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| Let

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| ''U''

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| =

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| '''B'''''n'',

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| ''p'' : '''B'''''n'' → '''B'''.

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|}

In these terms, analogies of the following form are being explored:

Jon Awbrey

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