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Translation Patterns

Translations

Translations

Translations

We can organize the patterns for symbols into three distinct groupings based upon the determinative effect of their representations:

Significants

Translations

Translations

Actual Symbols:

Manifest Translations (MT)

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Instantiants

Instantiants

Instantiants

Conceptual Symbols: 

Shadow Translations (ST)

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Notions

Instantiants

Instantiants

Encoded Symbols: 

Obscure Translations (OT)

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Manifest Translations: Actual Symbols

Significants

Entity patterns for the representation of material phenomena

Sign

MET--* A=_

Phenomenon (A) equals no other occasion (_).

Token

MET--| A=_

Phenomenon (A) equals no other occasion (_).

Qualisign

MET\-* A⊉β

Qualified phenomenon (A) is non-predicative of some notion (beta).

Tone

MET\-| A⊉β

Qualified phenomenon (A) is non-predicative of some notion (beta).

Legisign

MET-\* Aφβ

Quantified phenomenon (A) is disjoint from some notion (beta).

Habit

MET-\| Aφβ

Quantified phenomenon (A) is disjoint from some notion (beta).

Rheme

MET++* A=β

Distinct phenomenon (A) equals some notion (beta).

Seme

MET++| A=β

Distinct phenomenon (A) equals some notion (beta).

Dicisign

MET\\* A:β⊇γ

Definite phenomenon (A) means some notion (beta) predicates another notion (gamma).

Pheme

MET\\| A:β⊇γ

Definite phenomenon (A) means some notion (beta) predicates another notion (gamma).

Sinsign

MET||* A=B

Subsequent phenomenon (A) equals some prior phenomenon (B).

Actisign

MET||| A=B

Subsequent phenomenon (A) equals some prior phenomenon (B).

Argument

MET==* A=(B₁=B₂)

Confluent phenomenon (A) equals the equality of two co-valued phenomena (B₁ and B₂)

Delome

MET==| A=(B₁=B₂)

Confluent phenomenon (A) equals the equality of two co-valued phenomena (B₁ and B₂)


Iconics

Description patterns for the extrinsic representation of actuals

Image

MDT-* AφB

Image A is disjoint from phenomenon B and is self-evident in meaning.

Diagram

MDT-| AφB

Diagram A is disjoint from phenomenon B and inherits its meaning.

Icon

MDT\* A:α⊆B

Icon A means that phenomenon B predicates concept alpha and it is self-evident in meaning.

Metaphor

MDT\| A:α⊆B

Metaphor A means that phenomenon B predicates concept alpha and inherits its meaning.


Indexicals

Ascription patterns for the intrinsic representation of actuals

Pure Index

MAT-* A⊉B

Pure Index A non-predicates phenomenon B and is self-evident in meaning.

Reagent

MAT-| A⊉B

Reagent A non-predicates phenomenon B  and inherits its meaning.

Index

MAT\* A:α⊇B

Index A means that concept alpha predicates phenomenon B and it is self-evident in meaning.

Symptom

MAT\| A:α⊇B

Symptom A means that concept alpha predicates phenomenon B and inherits its meaning.


Symbolics

Process patterns for the dynamic representation of actuals

Symbol

MPT* A:B⊇C

Symbol A means that phenomenon B predicates phenomenon C and it is self-evident in meaning.

Replica

MPT| A:B⊇C

Replica A means that phenomenon B predicates phenomenon C and inherits its meaning.

Note: additional Entity Rivulets and Trickles can also be found in the Third Consideration.

Shadow Translations: Conceptual Symbols

Instantiants

Entity patterns for the representation of concepts

Instance

SET-- α=_

Instance alpha equals no occasion (_).

Creation

SET\- _=α; α⊉β

Creation alpha has conceptual meaning and means either: 

  1. no occasion (_) equals it, or
  2. it non-predicates concept beta

Alien

SET-\ α⊇_; αφβ

Alien alpha has conceptual meaning and means either: 

  1. it predicates no occasion (_)
  2. it is disjoint from concept beta

Reflection

SET++ α=α; α⊇α; α=β

Reflection alpha has conceptual meaning and means either: 

  1. it equals itself
  2. it predicates itself, or
  3. it equals concept beta

Relation

SET\\ α:β⊇γ; β=α; α⊇β

Relation alpha has conceptual meaning and means either: 

  1. concept beta predicates another concept gamma
  2. it equals concept beta, or
  3. it predicates concept beta

Conception

SET|| α=B

Conception alpha equals some phenomenon (B) and it has conceptual meaning.

Recognition

SET== α=(B₁=B₂)

Recognition alpha equals the equality of two co-valued phenomena (B₁ and B₂) and it has conceptual meaning.


Plurals

Description patterns for the extrinsic representation of concepts

Type

SDT- αφB

Type alpha is disjoint from phenomenon B and it has conceptual meaning.

Plural

SDT\ A:β⊆B

Plural alpha means that phenomenon B predicates concept beta and it has conceptual meaning.


Singulars

Ascription patterns for the intrinsic representation of concepts

Mark

SAT- α⊉B

Mark alpha non-predicates phenomenon B and it has conceptual meaning.

Singular

SAT\ α:β⊇B

Singular alpha means that concept beta predicates phenomenon B and it has conceptual meaning.


Actions

Process patterns for the dynamic representation of concepts

Action

SPT α:B⊇C

Action alpha means that phenomenon B predicates phenomenon C and it has conceptual meaning.

Note: additional Entity Rivulets and Trickles can also be found in the Third Consideration.

Obscure Translations: Encoded Symbols

Notions

Entity patterns for the representation of raw symbols

Notion

OET-- α=_

Notion alpha equals no occasion (_) and has no prior meaning.

Non-superior

OET\- _=α; α⊉β

Non-superior alpha has no prior meaning and means either: 

  1. no occasion (_) equals it, or
  2. it non-predicates concept beta

Other

OET-\ α⊇_; αφβ

Other alpha has no prior meaning and means either: 

  1. it predicates no occasion (_)
  2. it is disjoint from concept beta

Identity

OET++ α=α; α⊇α; α=β

Identity alpha has no prior meaning and means either: 

  1. it equals itself
  2. it predicates itself, or
  3. it equals concept beta

Ordination

OET\\ α:β⊇γ; β=α; α⊇β

Ordination alpha has no prior meaning and means either: 

  1. concept beta predicates another concept gamma
  2. it equals concept beta, or
  3. it predicates concept beta

Assertion

OET|| α=B

Assertion alpha equals some phenomenon (B) and it has no prior meaning.

Apodiction

OET== α=(B₁=B₂)

Apodiction alpha equals the equality of two co-valued phenomena (B₁ and B₂) and it has no prior meaning.


Cardinals

Description patterns for the extrinsic representation of raw symbols

Implicit Cardinal

ODT- αφB

Implicit Cardinal alpha is disjoint from phenomenon B and it has no prior meaning.

Explicit Cardinal

ODT\ A:β⊆B

Explicit Cardinal alpha means that phenomenon B predicates concept beta and it has no prior meaning.


Ordinals

Ascription patterns for the intrinsic representation of raw symbols

Implicit Ordinal

OAT- α⊉B

Implicit Ordinal alpha non-predicates phenomenon B and it has no prior meaning.

Explicit Ordinal

OAT\ α:β⊇B

Explicit Ordinal alpha means that concept beta predicates phenomenon B and it has no prior meaning.


Copulants

Process patterns for the dynamic representation of raw symbols

Copulant

OPT α:B⊇C

Copulant alpha means that phenomenon B predicates phenomenon C and it has no prior meaning.

Note: additional Entity Rivulets and Trickles can also be found in the Third Consideration.

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