Quantum Logic Processor 252 ( showing how I sequence backwards )

This work presents my original geometric logic processor design based on circular and spherical symmetry.

The processor is constructed from parity states arranged on circles, using four opposites and rotational closure rather than linear, tree, or graph-based logic. State transitions are defined through rotation, orientation, mirroring, and parity inversion within a closed geometric structure.

The system operates on discrete rotational positions (including four rotational positions of the triangle), where orientation combined with parity produces distinct logical states. Computation proceeds by deterministic sequencing through these rotations rather than probabilistic or statistical methods.

All diagrams shown here were designed and drawn by me and originate from my independent research, initiated in 2021. The sequencing method, geometric layout, rotational rules, and parity organization reflect my own approach to circular logic systems and are not derived from existing processor architectures or published designs.

This work is not a simulation of particles, neural networks, graphs, or node-based systems. It is a geometric logic model expressed through circles, parity, rotation, and symmetry, intended to demonstrate how computation can be structured without linear chains or hierarchical trees.

The images demonstrate:

• parity alternation through rotation

• left/right and odd/even symmetry

• mirrored state transitions

• closed-loop sequencing on a circular surface

• scalable repetition of a single geometric rule across multiple layers

These materials are shared publicly for study and learning. Attribution must be preserved. Any reuse, reproduction, or extension of this work requires clear acknowledgment of the original source and author.

Technical Description (from original notes and drawings)

This work documents the sequencing of my geometric logic processor designated 252, constructed on a circle / sphere using parity and rotation.

The processor is deterministic. It does not rely on probability, statistics, or simulation. State changes are performed through rotation, mirroring, and parity inversion within a closed circular structure.

The core logic uses four opposites, expressed through orientation and parity. In practice this resolves to odd / even alternation, with left/right inversion produced by rotation. A triangle has four rotational positions, and these rotations define distinct logical states when combined with parity.

Sequencing is performed clockwise and counter-clockwise, often counted backwards, to verify closure and symmetry. Transitions follow a fixed rule set (e.g. RR → RL → LR → LL), with heavy mirroring. No shortcuts are allowed: if lineage or rotation is skipped, the system does not close.

Across the drawings, I track pathways and state combinations manually. Early drawings document partial counts (e.g. 28 combinations, then additional pathways), while later drawings extend the same rule across larger circular compositions. The counting is intentional and exact; I am determining the full state space of the processor, not sampling it.

The processor scales by repetition of the same geometric rule. What may appear as multiple circles or layers are applications of the same logic under rotation. Each circle represents a full rotational cycle; quadrants and angular divisions are precise and meaningful.

Water flow, materials, and physical realization are noted only as context; the drawings themselves represent the logic structure, not an electrical schematic or particle model.

This is not topology in the abstract sense, and not a network. It is a geometric logic processor, built from circles, parity, and rotational closure.

All drawings shown are my own and originate from independent work begun in 2021. The sequencing, counts, and geometric rules are original to this work.

Author: Miljko Tijanic
Alias used in prior publications: Kiki Quake 3
Original work initiated: 2021
My master appenix - Full Documentation: https://zenodo.org/records/17979791