In this paper is proposed a kind of model theory for our axiomatic differential geometry. It is claimed that smooth manifolds, which have occupied the center stage in differential geometry, should be replaced by functors on the category of Weil algebras. Our model theory is geometrically natural and conceptually motivated, while the model theory of synthetic differential geometry is highly artificial and exquisitely technical
In our previous paper (Axiomatic Differential Geometry II-3) we havediscussed the general Jacobi ide...
Synthetic di¤erential geometry occupies a unique position in topos-theoreticphysics. Nevertheless it...
Smooth manifolds have been always understood intuitively as spaces that are infinitesimally linear a...
In this paper we give an axiomatization of di erential geometry comparable to model categories for h...
The principal objective in this paer is to study the relationship between the old kingdom of differe...
In our previous paper entitled "Axiomatic differential geometry -towards model categories of differe...
In our previous paper entitled \Axiomatic di erential geometry I - towards model categories of di er...
We refurbish our axiomatics of di erential geometry introduced in [5]. Then the notion of Euclideane...
Topos theory is a category-theoretic axiomatization of set theory. Model categories are a category-t...
The goal of this thesis is to explore the basic axiomatic theory of Syn- thetic Differential Geometr...
As the fourth paper of our series of papers concerned with axiomatic differential geometry, this pap...
I survey some of the model-theoretic work on differential algebra and related topics. 1 Introduction...
At the heart of differential geometry is the construction of the tangent bundle of a manifold. There...
Topos theory is a category-theoretical axiomatization of set theory. Model categories are a category...
First of all, we need to understand why there are other geometries such as Hyperbolic geometry besid...
In our previous paper (Axiomatic Differential Geometry II-3) we havediscussed the general Jacobi ide...
Synthetic di¤erential geometry occupies a unique position in topos-theoreticphysics. Nevertheless it...
Smooth manifolds have been always understood intuitively as spaces that are infinitesimally linear a...
In this paper we give an axiomatization of di erential geometry comparable to model categories for h...
The principal objective in this paer is to study the relationship between the old kingdom of differe...
In our previous paper entitled "Axiomatic differential geometry -towards model categories of differe...
In our previous paper entitled \Axiomatic di erential geometry I - towards model categories of di er...
We refurbish our axiomatics of di erential geometry introduced in [5]. Then the notion of Euclideane...
Topos theory is a category-theoretic axiomatization of set theory. Model categories are a category-t...
The goal of this thesis is to explore the basic axiomatic theory of Syn- thetic Differential Geometr...
As the fourth paper of our series of papers concerned with axiomatic differential geometry, this pap...
I survey some of the model-theoretic work on differential algebra and related topics. 1 Introduction...
At the heart of differential geometry is the construction of the tangent bundle of a manifold. There...
Topos theory is a category-theoretical axiomatization of set theory. Model categories are a category...
First of all, we need to understand why there are other geometries such as Hyperbolic geometry besid...
In our previous paper (Axiomatic Differential Geometry II-3) we havediscussed the general Jacobi ide...
Synthetic di¤erential geometry occupies a unique position in topos-theoreticphysics. Nevertheless it...
Smooth manifolds have been always understood intuitively as spaces that are infinitesimally linear a...