Galois Theory

Εξώφυλλο
Springer New York, 1 Δεκ 1997 - 172 σελίδες

This is an introduction to Galois Theory along the lines of Galois’s Memoir on the Conditions for Solvability of Equations by Radicals. It puts Galois’s ideas into historical perspective by tracing their antecedents in the works of Gauss, Lagrange, Newton, and even the ancient Babylonians. It also explains the modern formulation of the theory. It includes many exercises, with their answers, and an English translation of Galois’s memoir.

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Σχετικά με τον συγγραφέα (1997)

Harold M. Edwards is Emeritus Professor of Mathematics at New York University. His previous books are Advanced Calculus (1969, 1980, 1993), Riemann's Zeta Function (1974, 2001), Fermat's Last Theorem (1977), Galois Theory (1984), Divisor Theory (1990) and Linear Algebra (1995). Readers of his Advanced Calculus will know that his preference for constructive mathematics is not new. In 1980 he was awarded the Steele Prize for mathematical exposition for the Riemann and Fermat books.

Πληροφορίες βιβλιογραφίας

ΤίτλοςGalois Theory
Τόμος 101 του Graduate Texts in Mathematics
ΣυγγραφέαςHarold M. Edwards
Έκδοσηεικονογραφημένη, επανεκτύπωση
ΕκδότηςSpringer New York, 1997
ISBN038790980X, 9780387909806
Μέγεθος172 σελίδες
  
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