TL;DR
This paper introduces the concept of inference devices, explores their mathematical structure, proves fundamental limitations akin to the Halting theorem, and discusses implications for understanding the universe as a computational system.
Contribution
It formalizes inference devices, establishes their fundamental limitations, and draws deep connections to Turing machines and complexity theory, offering new insights into physical and computational bounds.
Findings
Inference devices share a common mathematical structure.
Impossibility results analogous to the Halting theorem are proven.
There is a unique strong inference device per universe.
Abstract
I show that physical devices that perform observation, prediction, or recollection share an underlying mathematical structure. I call devices with that structure "inference devices". I present a set of existence and impossibility results concerning inference devices. These results hold independent of the precise physical laws governing our universe. In a limited sense, the impossibility results establish that Laplace was wrong to claim that even in a classical, non-chaotic universe the future can be unerringly predicted, given sufficient knowledge of the present. Alternatively, these impossibility results can be viewed as a non-quantum mechanical "uncertainty principle". Next I explore the close connections between the mathematics of inference devices and of Turing Machines. In particular, the impossibility results for inference devices are similar to the Halting theorem for TM's.…
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