Results 251 to 260 of about 17,749 (300)
Securing Healthcare Book through Public Blockchain and Elliptic Curve Cryptography
Nelson Josias Gbètoho Saho
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2003
The purpose of the present text is to give an elementary introduction to the arithmetic of elliptic curves over number fields from a computational point of view. This branch of number theory is particularly accessible to computer assisted calculations, and the authors make use of this feature by approaching the theory from a computational point of view.
Schmitt, S., Zimmer, H.
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The purpose of the present text is to give an elementary introduction to the arithmetic of elliptic curves over number fields from a computational point of view. This branch of number theory is particularly accessible to computer assisted calculations, and the authors make use of this feature by approaching the theory from a computational point of view.
Schmitt, S., Zimmer, H.
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American Journal of Mathematics, 1931
Zwei ebene Kurven heißen perspektiv, wenn zwischen den Punkten der ersten und den Tangenten der zweiten eine \((1,1)\)-Korrespondenz derart hergestellt werden kann, daß jede Tangente der zweiten durch den entsprechenden Punkt der ersten läuft. So sind z. B.
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Zwei ebene Kurven heißen perspektiv, wenn zwischen den Punkten der ersten und den Tangenten der zweiten eine \((1,1)\)-Korrespondenz derart hergestellt werden kann, daß jede Tangente der zweiten durch den entsprechenden Punkt der ersten läuft. So sind z. B.
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2008
Abstract The congruent number problem. A congruent numberis a rational number qthat is the area of a right triangle, all of whose sides have rational length. We observe that if the triangle has sides a, b, and c, and if sis a rational number, then s2qis also a congruent number whose associated triangle has sides sa, sb,and sc.So it is ...
G H Hardy, E . M Wright
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Abstract The congruent number problem. A congruent numberis a rational number qthat is the area of a right triangle, all of whose sides have rational length. We observe that if the triangle has sides a, b, and c, and if sis a rational number, then s2qis also a congruent number whose associated triangle has sides sa, sb,and sc.So it is ...
G H Hardy, E . M Wright
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The subject of elliptic curves is one of the jewels of nineteenth-century mathematics, originated by Abel, Gauss, Jacobi, and Legendre. This book, reissued with a new Foreword, presents an introductory account of the subject in the style of the original discoverers, with references to and comments about more modern developments.
Henry McKean, Victor Moll, Alex Kasman
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Henry McKean, Victor Moll, Alex Kasman
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