Proving Decidability of Empty Theory & Linear Orders

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The empty theory refers to a theory in an empty language with no axioms, consisting solely of logical connectives, quantifiers, and equality, making it straightforward to decide. In a language with only single-argument predicates, the empty theory is classified as monadic logic, which is decidable. However, when the language includes at least one two-argument predicate, the empty theory becomes undecidable. The theory of linear orders is considered decidable through the method of quantifier elimination. Overall, the decidability of these theories varies significantly based on the structure and types of predicates involved.
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How do you prove the decidability of the empty theory and theory of linear orders?
 
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Uh, what is the "empty theory"?
 
By empty theory I mean the theory In the empty language ( ie no non logical symbols ) with no axioms.
 
The sentences of the empty theory over the empty language include only the logical connective, quantifiers and equality, so deciding them is quite simple. The empty theory over a language which includes only single-argument predicates is monadic logic, which is also decidable. The empty theory over a language which includes at least one predicate with two arguments is, however, not decidable.

The theory of linear orders should be decidable using quantifier elimination.
 

Thread 'Deductive proof in logic formal systems'

I was reading documentation about the soundness and completeness of logic formal systems. Consider the following $$\vdash_S \phi$$ where ##S## is the proof-system making part the formal system and ##\phi## is a wff (well formed formula) of the formal language. Note the blank on left of the turnstile symbol ##\vdash_S##, as far as I can tell it actually represents the empty set. So what does it mean ? I guess it actually means ##\phi## is a theorem of the formal system, i.e. there is a...
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