Add to ORKGWe expose some simple facts at the interplay between mathematics and the real world, putting in evidence mathematical objects ” nonlinear generalized functions” that are needed to model the real world, which appear to have been generally neglected up to now by mathematicians. Then we describe how a ”nonlinear theory of generalized functions” was obtained inside the Leopoldo Nachbin group of infinite dimensional holomorphy between 1980 and 1985 **. This new theory permits to multiply arbitrary distributions and contains the above mathematical objects, which shows that the features of this theory are natural and unavoidable for a mathematical description of the real world. Finally we present direct applications of the theory such as existence...
Using the existence of infinite numbers $k$ in the non-Archimedean ring of Robinson-Colombeau, we de...
Proceedings of The Symposium on Applied Mathematics : Wavelet, Chaos and Nonlinear PDEs / Edited by ...
Nonlinear evolution equations, i.e., partial differential equations with time t as one of the indepe...
AbstractAlgebras of generalized functions offer possibilities beyond the purely distributional appro...
Nonlinear operations such as multiplication of distributions are not allowed in the classical theory...
AbstractIn the new theory of generalized functions introduced by one author we study the generalized...
Generalized Functions play a central role in the understanding of differential equations containing ...
We give an overview of the development of algebras of generalzied funtions in the sense of Colombeau...
Combining mathematical theory, physical principles, and engineering problems, Generalized Calculus w...
In these lecture notes we present an introduction to non-standard analysis especially written for th...
In recent years there has been a growing interest in setting up the modeling and solving mathematica...
We present an extension of the classical theory of calculus of variations to generalized functions. ...
In many situations, the notion of function is not sufficient and it needs to be extended. A classica...
AbstractNonlinear nonstationary problems, arising in elastodynamics, have naturally a nonconservativ...
Several threads of the last 25 years’ developments in nonlinear wave theory that stem from the class...
Using the existence of infinite numbers $k$ in the non-Archimedean ring of Robinson-Colombeau, we de...
Proceedings of The Symposium on Applied Mathematics : Wavelet, Chaos and Nonlinear PDEs / Edited by ...
Nonlinear evolution equations, i.e., partial differential equations with time t as one of the indepe...
AbstractAlgebras of generalized functions offer possibilities beyond the purely distributional appro...
Nonlinear operations such as multiplication of distributions are not allowed in the classical theory...
AbstractIn the new theory of generalized functions introduced by one author we study the generalized...
Generalized Functions play a central role in the understanding of differential equations containing ...
We give an overview of the development of algebras of generalzied funtions in the sense of Colombeau...
Combining mathematical theory, physical principles, and engineering problems, Generalized Calculus w...
In these lecture notes we present an introduction to non-standard analysis especially written for th...
In recent years there has been a growing interest in setting up the modeling and solving mathematica...
We present an extension of the classical theory of calculus of variations to generalized functions. ...
In many situations, the notion of function is not sufficient and it needs to be extended. A classica...
AbstractNonlinear nonstationary problems, arising in elastodynamics, have naturally a nonconservativ...
Several threads of the last 25 years’ developments in nonlinear wave theory that stem from the class...
Using the existence of infinite numbers $k$ in the non-Archimedean ring of Robinson-Colombeau, we de...
Proceedings of The Symposium on Applied Mathematics : Wavelet, Chaos and Nonlinear PDEs / Edited by ...
Nonlinear evolution equations, i.e., partial differential equations with time t as one of the indepe...