We discuss central aspects of history of the concept of an affine differentiable manifold, as a proposal confirming the need for using some quantitative methods (drawn from elementary Model Theory) in Mathematical Historiography. In particular, we prove that this geometric structure is a syntactic rigid designator in the sense of Kripke-Putnam
In this paper is proposed a kind of model theory for our axiomatic differential geometry. It is clai...
The Hodge conjecture is one of the seven millennium problems, and is framed within differential geom...
34 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1962.U of I OnlyRestricted to the U...
We discuss central aspects of history of the concept of an affine differentiable manifold, as a prop...
In this first paper we outline what possible historic-epistemological role might have played the wor...
This paper will be a brief introduction to the theories of differential geometry. The foundation of t...
This textbook gives a concise introduction to the theory of differentiable manifolds, focusing on th...
The Boolean affine applications are the Boolean differentiable applications. If we accept to define ...
The theory of affine connections is, roughly speaking, a generalization of certain concepts of paral...
We consider differentiable maps in the framework of Abstract Differential Geometry and we prove a nu...
There are now engulfing theorems for topological, piecewise linear, and differentiable manifolds. Di...
The volume develops the foundations of differential geometry so as to include finite-dimensional spa...
We consider purely algebraic data generalizing the notion of a smooth differentiable manifold. It is...
Abstract: A self-contained introduction is presented of the notion of the (abstract) differentiable ...
In this essay, we give background to differential topology and utilize approximation techniques to p...
In this paper is proposed a kind of model theory for our axiomatic differential geometry. It is clai...
The Hodge conjecture is one of the seven millennium problems, and is framed within differential geom...
34 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1962.U of I OnlyRestricted to the U...
We discuss central aspects of history of the concept of an affine differentiable manifold, as a prop...
In this first paper we outline what possible historic-epistemological role might have played the wor...
This paper will be a brief introduction to the theories of differential geometry. The foundation of t...
This textbook gives a concise introduction to the theory of differentiable manifolds, focusing on th...
The Boolean affine applications are the Boolean differentiable applications. If we accept to define ...
The theory of affine connections is, roughly speaking, a generalization of certain concepts of paral...
We consider differentiable maps in the framework of Abstract Differential Geometry and we prove a nu...
There are now engulfing theorems for topological, piecewise linear, and differentiable manifolds. Di...
The volume develops the foundations of differential geometry so as to include finite-dimensional spa...
We consider purely algebraic data generalizing the notion of a smooth differentiable manifold. It is...
Abstract: A self-contained introduction is presented of the notion of the (abstract) differentiable ...
In this essay, we give background to differential topology and utilize approximation techniques to p...
In this paper is proposed a kind of model theory for our axiomatic differential geometry. It is clai...
The Hodge conjecture is one of the seven millennium problems, and is framed within differential geom...
34 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1962.U of I OnlyRestricted to the U...