AbstractWe 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
Our purpose is to formalize two potential refinements of single-sorted algebraic data types – subalg...
AbstractIn theoretical computer science and mathematics the models of combinatory logic are of signi...
AbstractThe question of implementability and expressive power of equational axiom definitions of dat...
We define and study the class of all stack algebras as the class of all minimal algebras in a varie...
An algebraic specification is called ω-complete or inductively complete if all (open as well as clos...
This extended abstract first presents a new category theoretic approach to equationally axiomatizabl...
AbstractFor minimal algebras, and under certain assumptions on the domain of parameters, it is shown...
AbstractA formal framework is proposed for discussing the algebraic properties of data types. In par...
AbstractThis paper studies some computability notions for abstract data types, and in particular com...
AbstractBergstra and Tucker (1983) conjectured that a semicomputable (abstract) data type has a fini...
This dissertation examines some aspects of the relationship between λ calculus and universal algebr...
The following fundamental theorem about the adequacy of the algebraic specification methods for data...
AbstractWe consider the problem of data type extensions. Guttag, Horowitz, and Musser have pointed o...
AbstractEquational presentation of abstract data types is generalized to presentation by multiequati...
Data types may be considered as objects in any suitable category, and need not necessarily be ordere...
Our purpose is to formalize two potential refinements of single-sorted algebraic data types – subalg...
AbstractIn theoretical computer science and mathematics the models of combinatory logic are of signi...
AbstractThe question of implementability and expressive power of equational axiom definitions of dat...
We define and study the class of all stack algebras as the class of all minimal algebras in a varie...
An algebraic specification is called ω-complete or inductively complete if all (open as well as clos...
This extended abstract first presents a new category theoretic approach to equationally axiomatizabl...
AbstractFor minimal algebras, and under certain assumptions on the domain of parameters, it is shown...
AbstractA formal framework is proposed for discussing the algebraic properties of data types. In par...
AbstractThis paper studies some computability notions for abstract data types, and in particular com...
AbstractBergstra and Tucker (1983) conjectured that a semicomputable (abstract) data type has a fini...
This dissertation examines some aspects of the relationship between λ calculus and universal algebr...
The following fundamental theorem about the adequacy of the algebraic specification methods for data...
AbstractWe consider the problem of data type extensions. Guttag, Horowitz, and Musser have pointed o...
AbstractEquational presentation of abstract data types is generalized to presentation by multiequati...
Data types may be considered as objects in any suitable category, and need not necessarily be ordere...
Our purpose is to formalize two potential refinements of single-sorted algebraic data types – subalg...
AbstractIn theoretical computer science and mathematics the models of combinatory logic are of signi...
AbstractThe question of implementability and expressive power of equational axiom definitions of dat...