Q2: Independence of CS and CA

You state that CS (certainty of statements) and CA (certainty of algorithms) are independent within a single processing step, which justifies the multiplicative RO structure and enables fault isolation.

Is this independence:

ontological — CS and CA truly do not influence each other at that step,

or

procedural — they may influence each other in reality, but must be treated as independent to preserve accountability and make correction possible?

And directly:

What breaks in RF if CS and CA are allowed to co-determine each other inside the same step?

Your answer can be short.

there is no continuity in this world from the deepest basic level.

Understood.

You’re grounding the independence below methodology:

The world is fundamentally discrete, not continuous.
A “processing step” is a real ontological boundary, not a modeling convenience.
Within such a step, S and A are fixed states, not co-evolving processes.
Therefore CS and CA cannot co-determine each other inside the step — only between steps via the correction loop.

So the independence of CS and CA is ontological, not merely procedural.

If continuity were allowed at the base level, accountability would dissolve into ambiguity.

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