Color-Coded Epistemic Modes in a Jungian Hexagon of Opposition (2022), p. 311
by Stern, Julio M.
Copyright according to our policy
Caption
- Top and bottom-left: Medieval diagrams of tri-, quadri- and hexa-polar oppositional structures; Bottom-right: Blanche [9] hexagon of opposition for $(\Box,\Diamond,\neg)$ modal logic operators of necessity, possibility, and negation, or $(<,>,=,\neq)$ (in)equality relations, including oppositional relations of contradiction ($=\!\!=\!\!=$), contrariety ($--$), subcontrariety ($\cdots$), and subalternation ($\rightarrow$)
- Number of labels per vertex (at most)
- 1
- Errors in the diagram
- No
- Shape
- Hexagon (regular)
- Colinearity range
- 0
- Coplanarity range
- 0
- Cospatiality range
- 0
- Representation of contradiction
- By central symmetry
Logic
Geometry
- Conceptual info
- No
- Mnemonic support (AEIO, purpurea ...)
- No
- Form
- rectangular
- Label type
- symbolic
- Symbolic field
- logic
- Contains partial formulas or symbols
- No
- Logical system
- propositional logic
- Contains definitions of relations
- No
- Form
- dotted lines ,
- solid lines ,
- dashed lines ,
- double solid lines
- Has arrowheads
- Yes
- Overlap
- No
- Curved
- No
- Hooked
- No
- As wide as vertices
- No
- Contains text
- No
Vertex description
Edge description
- Diagram is colored
- No
- Diagram is embellished
- No