The Dirac δ function has solid roots in nineteenth century work in Fourier analysis and singular integrals by Cauchy and others, anticipating Dirac’s discovery by over a century, and illuminating the nature of Cauchy’s infinitesimals and his infinitesimal definition of δ
Abstract. Mathematical justifications are given for several integral and series representations of t...
It is well known that Cauchy was the first to define the derivative of a function in terms of a rigo...
SummariesIt is well known that Cauchy was the first to define the derivative of a function in terms ...
The "deltafunction" was invented by P. A. M. Dirac around 1930 in order to compactly expre...
The "deltafunction" was invented by P. A. M. Dirac around 1930 in order to compactly expre...
SUMMARY. — Around 1820, Cauchy, Fourier, and Poisson, in their work on mathematical physics, used me...
SUMMARY. — Around 1820, Cauchy, Fourier, and Poisson, in their work on mathematical physics, used me...
Another Demonstration gives some representations for the Dirac deltafunction as the limit of element...
Another Demonstration gives some representations for the Dirac deltafunction as the limit of element...
The theory of tempered distributions allows us to give a rigorous meaning to the Dirac delta functio...
Dirac delta functions are introduced to students of signal processing in their sophomore year. Quite...
This book is a complete English translation of Augustin-Louis Cauchy's historic 1823 text (his first...
In this paper, Dirac delta function is revisited and we derive the N-th derivative of Dirac delta fu...
In this paper, Dirac delta function is revisited and we derive the N-th derivative of Dirac delta fu...
In this paper, Dirac delta function is revisited and we derive the N-th derivative of Dirac delta fu...
Abstract. Mathematical justifications are given for several integral and series representations of t...
It is well known that Cauchy was the first to define the derivative of a function in terms of a rigo...
SummariesIt is well known that Cauchy was the first to define the derivative of a function in terms ...
The "deltafunction" was invented by P. A. M. Dirac around 1930 in order to compactly expre...
The "deltafunction" was invented by P. A. M. Dirac around 1930 in order to compactly expre...
SUMMARY. — Around 1820, Cauchy, Fourier, and Poisson, in their work on mathematical physics, used me...
SUMMARY. — Around 1820, Cauchy, Fourier, and Poisson, in their work on mathematical physics, used me...
Another Demonstration gives some representations for the Dirac deltafunction as the limit of element...
Another Demonstration gives some representations for the Dirac deltafunction as the limit of element...
The theory of tempered distributions allows us to give a rigorous meaning to the Dirac delta functio...
Dirac delta functions are introduced to students of signal processing in their sophomore year. Quite...
This book is a complete English translation of Augustin-Louis Cauchy's historic 1823 text (his first...
In this paper, Dirac delta function is revisited and we derive the N-th derivative of Dirac delta fu...
In this paper, Dirac delta function is revisited and we derive the N-th derivative of Dirac delta fu...
In this paper, Dirac delta function is revisited and we derive the N-th derivative of Dirac delta fu...
Abstract. Mathematical justifications are given for several integral and series representations of t...
It is well known that Cauchy was the first to define the derivative of a function in terms of a rigo...
SummariesIt is well known that Cauchy was the first to define the derivative of a function in terms ...
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