We prove that every elementary $(\infty,1)$-topos has a natural number object. We achieve this by defining the loop space of the circle and showing that we can construct a natural number object out of it. Part of the proof involves showing that various definitions of natural number objects (Lawvere, Freyd and Peano) agree with each other in an elementary $(\infty,1)$-topos. As part of this effort we also study the internal object of contractibility in $(\infty,1)$-categories, which is of independent interest. Finally, we discuss various applications of natural number objects. In particular, we use it to define internal sequential colimits in an elementary $(\infty,1)$-topos
In this thesis we construct the universal coCartesian fibration , which (strictly) classifies coCart...
This paper introduces a novel object that has less structure than, and is ontologically prior to the...
AbstractThe object of study of the present paper may be considered as a model, in an elementary topo...
We prove that every elementary (infinity, 1)-topos has a natural number object. We achieve this by d...
Let L be an elementary topos. The axiom of infinity, asserting that L has a natural numbers object, ...
AbstractOur aim is to show that if a topos has a natural number object, then this object N can be eq...
We prove that every locally Cartesian closed $\infty$-category with subobject classifier has a stric...
The end goal of this work is to define and study an elementary higher topos. We will achieve this by...
Thesis presents the notion of elementary topos in order to state and prove Barr's theorem. We discus...
A topos is a category satisfying certain axioms. By satisfying the topos axioms, a category can be t...
By a classifying topos for a first-order theory T, we mean a toposE such that, for any topos F, mode...
We propose for the Effective Topos an alternative construction: a realisability framework composed o...
AbstractWe define a constructive topos to be a locally cartesian closed pretopos. The terminology is...
Topoi originated in the 1960's when Grothendieck found a powerful way to study categories related to...
AbstractThis note sets down some facts about natural number objects in the Dialectica category Dial2...
In this thesis we construct the universal coCartesian fibration , which (strictly) classifies coCart...
This paper introduces a novel object that has less structure than, and is ontologically prior to the...
AbstractThe object of study of the present paper may be considered as a model, in an elementary topo...
We prove that every elementary (infinity, 1)-topos has a natural number object. We achieve this by d...
Let L be an elementary topos. The axiom of infinity, asserting that L has a natural numbers object, ...
AbstractOur aim is to show that if a topos has a natural number object, then this object N can be eq...
We prove that every locally Cartesian closed $\infty$-category with subobject classifier has a stric...
The end goal of this work is to define and study an elementary higher topos. We will achieve this by...
Thesis presents the notion of elementary topos in order to state and prove Barr's theorem. We discus...
A topos is a category satisfying certain axioms. By satisfying the topos axioms, a category can be t...
By a classifying topos for a first-order theory T, we mean a toposE such that, for any topos F, mode...
We propose for the Effective Topos an alternative construction: a realisability framework composed o...
AbstractWe define a constructive topos to be a locally cartesian closed pretopos. The terminology is...
Topoi originated in the 1960's when Grothendieck found a powerful way to study categories related to...
AbstractThis note sets down some facts about natural number objects in the Dialectica category Dial2...
In this thesis we construct the universal coCartesian fibration , which (strictly) classifies coCart...
This paper introduces a novel object that has less structure than, and is ontologically prior to the...
AbstractThe object of study of the present paper may be considered as a model, in an elementary topo...