-20%
Cinquante Ans de Polynomes – Fifty Years of Polynomials: Proceedings of a Conference held in honour of Alain Durand at the Institut Henri Poincare. Paris, France, May 26-27, 1988
Original price was: ₹5,511.00.₹4,410.00Current price is: ₹4,410.00.
Before his untimely death in 1986, Alain Durand had undertaken a systematic and in-depth study of the arithmetic perspectives of polynomials. Four unpublished articles of his, formed the centerpiece of attention at a colloquium in Paris in 1988 and are reproduced in this volume together with 11 other papers on closely related topics
-20%
Cinquante Ans de Polynomes – Fifty Years of Polynomials: Proceedings of a Conference held in honour of Alain Durand at the Institut Henri Poincare. Paris, France, May 26-27, 1988
Original price was: ₹5,511.00.₹4,410.00Current price is: ₹4,410.00.
Before his untimely death in 1986, Alain Durand had undertaken a systematic and in-depth study of the arithmetic perspectives of polynomials. Four unpublished articles of his, formed the centerpiece of attention at a colloquium in Paris in 1988 and are reproduced in this volume together with 11 other papers on closely related topics
-20%
Diophantine Approximation: Lectures given at the C.I.M.E. Summer School held in Cetraro, Italy, June 28 – July 6, 2000
Original price was: ₹5,511.00.₹4,410.00Current price is: ₹4,410.00.
Diophantine Approximation is a branch of Number Theory having its origins in the problem of producing “best” rational approximations to given realn- bers. Since the early work of Lagrange on Pell’s equation and the pioneering work of Thue on the rational approximations to algebraic numbers of degree ? 3, it has been clear how, in addition to its own speci?c importance and - terest, the theory can have fundamental applications to classical diophantine problems in Number Theory.
-20%
Diophantine Approximation: Lectures given at the C.I.M.E. Summer School held in Cetraro, Italy, June 28 – July 6, 2000
Original price was: ₹5,511.00.₹4,410.00Current price is: ₹4,410.00.
Diophantine Approximation is a branch of Number Theory having its origins in the problem of producing “best” rational approximations to given realn- bers. Since the early work of Lagrange on Pell’s equation and the pioneering work of Thue on the rational approximations to algebraic numbers of degree ? 3, it has been clear how, in addition to its own speci?c importance and - terest, the theory can have fundamental applications to classical diophantine problems in Number Theory.