The data type variety of stack algebras
Publication date
1995
Authors
Bergstra, J.A.
Tucker, J.V.
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Document Type
Article
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Abstract
We define and study the class of all stack algebras as the class of all minimal algebras in
a variety defined by an infinite recursively enumerable set of equations. Among a number of
results, we show that the initial model of the variety is computable, that its equational theory is
decidable, but that its equational deduction problem is undecidable. We show that it cannot be
finitely axiomatised by equations, but it can be finitely axiomatised by equations with a hidden
sort and functions. This class of all stack algebras, together with its specifications, can be used to
survey the many models in the literature on stacks in a systematic way, and hence give the study
of the stack some mathematical coherence.