Polynym Math

set comparison between two polynyms

Ptraffic flow ⊥ Prisk taking

Random Picks

Equality

$$A \neq B$$
A is not equal to B

Subset

$$A \not\subseteq B$$
A is not a subset of or equal to B

Superset

$$A \not\supseteq B$$
A is not a superset of or equal to B

Intersection

$$A \cap B =$$
{ }

Union

$$A \cup B =$$
{ exploit, explore, free flow, synchronized flow, wide moving jam }

Symmetric Difference

$$A \ominus B =$$
{ exploit, explore, free flow, synchronized flow, wide moving jam }

Difference

$$A - B =$$
{ free flow, synchronized flow, wide moving jam }

Difference

$$B - A =$$
{ exploit, explore }

Cartesian Product

$$A \times B =$$
{ (free flow, exploit),
(free flow, explore),
(synchronized flow, exploit),
(synchronized flow, explore),
(wide moving jam, exploit),
(wide moving jam, explore) }
Polynym
Three-phase traffic theory

traffic flow

Source
Boris Kerner
Area
Physics
Mode
step
Depth
3
User
scotty

vs.
Polynym
Risk

risk taking

Area
cognitive science
Mode
part
Depth
2
User
dane
3 steps of traffic flow

2 parts of risk taking
free flow
synchronized flow
wide moving jam

explore
exploit
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