1,090 research outputs found
The Universal Theory of First Order Algebras and Various Reducts
First order formulas in a relational signature can be considered as
operations on the relations of an underlying set, giving rise to multisorted
algebras we call first order algebras. We present universal axioms so that an
algebra satisfies the axioms iff it embeds into a first order algebra.
Importantly, our argument is modular and also works for, e.g., the positive
existential algebras (where we restrict attention to the positive existential
formulas) and the quantifier-free algebras. We also explain the relationship to
theories, and indicate how to add in function symbols.Comment: 30 page
Axiomatizing complex algebras by games
Submitted versio
Division by zero in non-involutive meadows
Meadows have been proposed as alternatives for fields with a purely
equational axiomatization. At the basis of meadows lies the decision to make
the multiplicative inverse operation total by imposing that the multiplicative
inverse of zero is zero. Thus, the multiplicative inverse operation of a meadow
is an involution. In this paper, we study `non-involutive meadows', i.e.\
variants of meadows in which the multiplicative inverse of zero is not zero,
and pay special attention to non-involutive meadows in which the multiplicative
inverse of zero is one.Comment: 14 page
Dynamic Congruence vs. Progressing Bisimulation for CCS
Weak Observational Congruence (woc) defined on CCS agents is not a bisimulation since it does not require two states reached by bisimilar computations of woc agents to be still woc, e.g. \alpha.\tau.\beta.nil and \alpha.\beta.nil are woc but \tau.\beta.nil and \beta.nil are not. This fact prevent us from characterizing CCS semantics (when \tau is considered invisible) as a final algebra, since the semantic function would induce an equivalence over the agents that is both a congruence and a bisimulation. In the paper we introduce a new behavioural equivalence for CCS agents, which is the coarsest among those bisimulations which are also congruences. We call it Dynamic Observational Congruence because it expresses a natural notion of equivalence for concurrent systems required to simulate each other in the presence of dynamic, i.e. run time, (re)configurations. We provide an algebraic characterization of Dynamic Congruence in terms of a universal property of finality. Furthermore we introduce Progressing Bisimulation, which forces processes to simulate each other performing explicit steps. We provide an algebraic characterization of it in terms of finality, two logical characterizations via modal logic in the style of HML and a complete axiomatization for finite agents (consisting of the axioms for Strong Observational Congruence and of two of the three Milner's -laws). Finally, we prove that Dynamic Congruence and Progressing Bisimulation coincide for CCS agents
Semigroups with if-then-else and halting programs
The "if–then–else" construction is one of the most elementary programming commands, and its abstract laws have been widely studied, starting with McCarthy. Possibly, the most obvious extension of this is to include the operation of composition of programs, which gives a semigroup of functions (total, partial, or possibly general binary relations) that can be recombined using if–then–else. We show that this particular extension admits no finite complete axiomatization and instead focus on the case where composition of functions with predicates is also allowed (and we argue there is good reason to take this approach). In the case of total functions — modeling halting programs — we give a complete axiomatization for the theory in terms of a finite system of equations. We obtain a similar result when an operation of equality test and/or fixed point test is included
Monoids with tests and the algebra of possibly non-halting programs
We study the algebraic theory of computable functions, which can be viewed as arising from possibly non-halting computer programs or algorithms, acting on some state space, equipped with operations of composition, if-then-else and while-do defined in terms of a Boolean algebra of conditions. It has previously been shown that there is no finite axiomatisation of algebras of partial functions under these operations alone, and this holds even if one restricts attention to transformations (representing halting programs) rather than partial functions, and omits while-do from the signature. In the halting case, there is a natural “fix”, which is to allow composition of halting programs with conditions, and then the resulting algebras admit a finite axiomatisation. In the current setting such compositions are not possible, but by extending the notion of if-then-else, we are able to give finite axiomatisations of the resulting algebras of (partial) functions, with while-do in the signature if the state space is assumed finite. The axiomatisations are extended to consider the partial predicate of equality. All algebras considered turn out to be enrichments of the notion of a (one-sided) restriction semigrou
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