About: Diagram

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An Entity of Type : dbkwik:resource/TGVw_48bfxR4O_s_eW_eZQ==, within Data Space : 134.155.108.49:8890 associated with source dataset(s)

A diagram is a two-dimensional geometric symbolic representation of information according to some visualization technique. Sometimes, the technique uses a three-dimensional visualization which is then projected onto the two-dimensional surface.

Attributes	Values
rdf:type	Item
rdfs:label	Diagram
rdfs:comment	A diagram is a two-dimensional geometric symbolic representation of information according to some visualization technique. Sometimes, the technique uses a three-dimensional visualization which is then projected onto the two-dimensional surface. The Super Friends used a diagram on their video bank to illustrate how photons work. Let M be a structure in a language L. Let L(M) denote a new language, in which we have added a new constant symbol a for each element a of M. Then M can be expanded to an L(M)-structure in a tautological way. The diagram of M, denoted diag(M) is the collection of all quantifier-free L(M)-statements true in M. The elementary diagram of M, denoted eldiag(M) is the collection of all L(M)-statements true in M. The significance of these notions are that:
sameAs	dbr:Diagram
Level	1(xsd:integer)
dcterms:subject	Definition Miscellaneous dbkwik:resource/9OA2frSonuS4WYWGOl-3Vg== dbkwik:resource/xmi-Ac788vwr0LmCG0zZgw== Mathematics
store	No
low	0(xsd:integer)
Examine	A scroll with a diagram drawn on it.
Tradeable	No
Equipable	No
destroy	If you destroy this scroll, you can find another in the body room of the elemental workshop.
disassembly	Yes
Quest	Elemental Workshop III
kept	always
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Category	default
Stackable	No
Name	Diagram
Value	1(xsd:integer)
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Members	Yes
Weight	0(xsd:integer) 0(xsd:double)
Update	The Elemental Workshop III
ID	18701(xsd:integer)
high	0(xsd:integer)
Release	2010-05-25(xsd:date)
abstract	A diagram is a two-dimensional geometric symbolic representation of information according to some visualization technique. Sometimes, the technique uses a three-dimensional visualization which is then projected onto the two-dimensional surface. The Super Friends used a diagram on their video bank to illustrate how photons work. Let M be a structure in a language L. Let L(M) denote a new language, in which we have added a new constant symbol a for each element a of M. Then M can be expanded to an L(M)-structure in a tautological way. The diagram of M, denoted diag(M) is the collection of all quantifier-free L(M)-statements true in M. The elementary diagram of M, denoted eldiag(M) is the collection of all L(M)-statements true in M. The significance of these notions are that: * Models of the diagram of M are the same thing as L-structures extending M. * Models of the elementary diagram of M are the same thing as elementary extensions of M.

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