Información del autor
Autor Corrales Rodrigáñez, Carmen |
Documentos disponibles escritos por este autor (34)
![](./images/expand_all.gif)
![](./images/collapse_all.gif)
![Selecciones disponibles](./images/orderby_az.gif)
![]()
texto impreso
Corrales Rodrigáñez, Carmen | 1999El 6 de agosto de 1998, a la edad de 92 años, murio en Princeton André Weil. La influencia de su obra ha sido enorme, y resulta difícil resumirla en un par de páginas. Nos limitaremos, pues, a hacer un pequeño boceto de su contribución en tres d[...]![]()
texto impreso
![]()
texto impreso
![]()
texto impreso
![]()
texto impreso
![]()
texto impreso
![]()
texto impreso
![]()
texto impreso
![]()
texto impreso
This is a nice expository paper at an elementary level which describes the type of mathematics used inWiles’ proof of Fermat’s Last Theorem. The first section of the paper is a discussion about tessellations of the plane with several nice exampl[...]![]()
texto impreso
![]()
texto impreso
![]()
texto impreso
![]()
texto impreso
![]()
texto impreso
Twentieth century mathematicians have succesfully mastered a method or way of looking that combines local and global tools, and which has lead, for example, to the resolution of long standing open problems such as Fermat´s Last Theorem2 and the [...]![]()
texto impreso
![]()
texto impreso
![]()
texto impreso
![]()
texto impreso
![]()
texto impreso
![]()
texto impreso
Let K be a complete and algebraically closed non-Archimedean valued field. Following ideas of Marc Krasner and Philippe Robba, the author defines K-entire and K-meromorphic functions from K to K, and extends the definitions of Nevanlinna theory [...]![]()
texto impreso
![]()
texto impreso
![]()
texto impreso
It is known [J. F. Ritt, Trans. Am. Math. Soc. 23, 51-66 (1922; JFM 48.0079.01), H. T. Engstrom, Am. J. Math. 63, 249–255 (1941; Zbl 0025.10403), H.Levi, ibid. 64, 389–400 (1942; Zbl 0063.03512), F. Dorey and G. Whaples, J. Algebra 28, 88-101 (1[...]![]()
texto impreso
![]()
texto impreso
![]()
texto impreso
This is an expository article on p-adic fields. It contains a historical introduction and a construction of the p-adic number field by completion for the p-adic distance overQ. The paper concludes with the Hasse-Minkowski theorem for quadratic f[...]![]()
texto impreso
![]()
texto impreso
We give an algorithm to determine a finite set of generators of the unit group of an order in a non-split classical quaternion algebra H(K) over an imaginary quadratic extension K of the rationals. We then apply this method to obtain a presentat[...]![]()
texto impreso
Unit groups of orders in quaternion algebras over number fields provide important examples of non-commutative arithmetic groups. Let K = Q(d ) be a quadratic field with d![]()
texto impreso
![]()
texto impreso
![]()
texto impreso
Let F be a number field, Suppose x, y ? F* have the property that for all n ? Z and almost all prime ideals p of the ring of integers of F* one has that yn =1 (mod p) whenever xn=1 (mod p). We show that then y is a power of x. This answers a que[...]![]()
texto impreso
“Philosophy is written in that great book which ever lies before our eyes – I mean the universe – but we cannot understand it if we do not first learn the language and grasp the symbols, in which it is written. This book is written in the mathem[...]