From
"Cybernetics & Human Knowing", Vol. 24 (2017), No. 3-4, pp.
161-188
Diamond Bracket
Forms
and How to
Count to Two
by Nathaniel Hellerstein
0. Preface
This paper extends G.
Spencer Brown’s “Laws of Form” notation to four-valued “diamond” logic. Diamond
logic is a wave-form logic that I adapted from Louis Kauffman’s work; it
contains the paradox values “true but false” and “false but true”. These resolve
the liar paradox and other paradoxes of self-reference.
This paper follows the
practice of denoting Brown’s crossing symbol by parentheses; in this case
brackets: [x]. I denote the marked form [] as 1, and the unmarked “doublecross”
form [[]] as 0; to these, add two new forms; 6 and 9. These forms follow laws
similar to Brown’s form laws. These laws are complete; but proof of this is
left
as an exercise for the student. This paper gives a full proof that diamond logic supports
self-reference. Any system of statements referring to each other in diamond
logic has a lattice of solutions.
This paper ends by
analyzing “modulators” – that is, circuits that count to two. Brown gave out
one at the end of “Laws of Form”; Louis Kauffman gave another in his paper “Knot
Automata”. Here I apply “diffraction” – an operation unique to diamond logic –
and reveal both to be circular “rotor” circuits.
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