Add to ORKGWe investigate the equational fragments of formal systems for arithmetic by means of the equational theory of f-rings and of their positive cones, starting from the observation that a model of arithmetic is the positive cone of a discretely ordered ring. A consequence of the discreteness of the order is the presence of a discriminator, which allows us to derive many properties of the models of our equational theories. For example, the spectral topology of discrete f-rings is a Stone topology. We also characterize the equational fragment of lopen, and we obtain an equational version of Godel's First Incompleteness Theorem. Finally, we prove that the lattice of subvarieties of the variety of discrete f-rings is uncountable, and that the latti...
Abstract. Birkhoff’s completeness theorem of equational logic asserts the coincidence of the model-t...
18 pagesWe develop the basic theory of geometrically closed rings as a generalisation of algebraical...
We try to obtain a dynamical theory describing the algebraic properties of the field of real numbers...
We investigate the equational fragments of formal systems for arithmetic by means of the equational ...
This paper introduces several families of equational classes of unital f-rings that are defined by e...
The solved theories of the ring varieties are investigated. The existence of the finite-based variet...
Does every finite algebraic system A with finitely many operations possess a finite list of polynomi...
AbstractUsing the theory of Witt vectors, we define ring structures on several well-known groups of ...
AbstractWe completely characterize those distributive lattices which can be obtained as elementary s...
We associate to each variety of algebras of finite signature a function on the positive integers cal...
What follows is an incomplete survey of the topic of the title that reflects the biases of the autho...
The rational, real and complex numbers with their standard operations, including division, are parti...
We associate to each variety of algebras of finite signature a function on the positive integers cal...
We consider finite decidable FP-sketches within an arithmetic universe. By an FP-sketch we mean a sk...
We present a formalization of coherent and strongly discrete rings in type theory. This is a fundame...
Abstract. Birkhoff’s completeness theorem of equational logic asserts the coincidence of the model-t...
18 pagesWe develop the basic theory of geometrically closed rings as a generalisation of algebraical...
We try to obtain a dynamical theory describing the algebraic properties of the field of real numbers...
We investigate the equational fragments of formal systems for arithmetic by means of the equational ...
This paper introduces several families of equational classes of unital f-rings that are defined by e...
The solved theories of the ring varieties are investigated. The existence of the finite-based variet...
Does every finite algebraic system A with finitely many operations possess a finite list of polynomi...
AbstractUsing the theory of Witt vectors, we define ring structures on several well-known groups of ...
AbstractWe completely characterize those distributive lattices which can be obtained as elementary s...
We associate to each variety of algebras of finite signature a function on the positive integers cal...
What follows is an incomplete survey of the topic of the title that reflects the biases of the autho...
The rational, real and complex numbers with their standard operations, including division, are parti...
We associate to each variety of algebras of finite signature a function on the positive integers cal...
We consider finite decidable FP-sketches within an arithmetic universe. By an FP-sketch we mean a sk...
We present a formalization of coherent and strongly discrete rings in type theory. This is a fundame...
Abstract. Birkhoff’s completeness theorem of equational logic asserts the coincidence of the model-t...
18 pagesWe develop the basic theory of geometrically closed rings as a generalisation of algebraical...
We try to obtain a dynamical theory describing the algebraic properties of the field of real numbers...