A. Baker scite author profile

First published in 1975, this classic book gives a systematic account of transcendental number theory, that is those numbers which cannot be expressed as the roots of algebraic equations having rational coefficients. Their study has developed into a fertile and extensive theory enriching many branches of pure mathematics. Expositions are presented of theories relating to linear forms in the logarithms of algebraic numbers, of Schmidt's generalisation of the Thue-Siegel-Roth theorem, of Shidlovsky's work on Siegel's |E|-functions and of Sprindzuk's solution to the Mahler conjecture. The volume was revised in 1979: however Professor Baker has taken this further opportunity to update the book including new advances in the theory and many new references.

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Diophantine Approximation and Hausdorff Dimension

Baker

Schmidt

1970

Proceedings of the London Mathematical Society

122

200

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Linear forms in the logarithms of algebraic numbers

1966

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Bounds for the solutions of the hyperelliptic equation

Baker

1969

Math. Proc. Camb. Phil. Soc.

146

163

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A. Baker

THE EQUATIONS 3x²−2 = y² AND 8x²−7 = z²

Transcendental Number Theory

Diophantine Approximation and Hausdorff Dimension

Linear forms in the logarithms of algebraic numbers

Bounds for the solutions of the hyperelliptic equation

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Product

Resources

About

A. Baker

THE EQUATIONS 3x2−2 = y2 AND 8x2−7 = z2

Transcendental Number Theory

Diophantine Approximation and Hausdorff Dimension

Linear forms in the logarithms of algebraic numbers

Bounds for the solutions of the hyperelliptic equation

Contact Info

Product

Resources

About

THE EQUATIONS 3x²−2 = y² AND 8x²−7 = z²