Diophantine inequalities
著者
書誌事項
Diophantine inequalities
(London Mathematical Society monographs, new ser.,
Clarendon Press , Oxford University Press, 1986
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注記
Bibliography: p. [267]-272
Includes index
内容説明・目次
内容説明
This is the first book in a new series of London Mathematical Society Monographs. In a sequence n 2 with n=1,...,N, elements can be found that are close to zero modulo one. Starting with the work of I.M. Vinogradov and H. Heilbronn, the author develops the theme of nonlinear Diophantine approximation in a number of different directions. For example, one can consider simultaneous approximation to integers by values of a set of quadratic forms; or a discrete analogue (small solutions of a system of homogeneous congruences). This monograph gives an account of the most important and interesting results of the last ten years in this area at a leisurely pace that should be accessible to postgraduate students but also of value to research workers in analytic number theory.
目次
- Fourier analysis
- Heilbronn's theorem and Schmidt's extension
- Vinogradov's mean value method
- The solution of Davenport's problem
- The method of sums of kth powers
- Schmidt's lattice methods
- The lattice methods for polynomials of arbitrary degree
- Quadratic forms
- Simultaneous approximation for quadratic forms and additive forms
- Nonnegative solutions of additive equations
- Small solutions of additive congruences
- Small solutions of additive equations of odd degree
- Diophantine inequalities for forms of odd degree
- Exponential sums: forms with integer coefficients
- The invariants g and h
- Exponential sums: polynomials on a finite group
- Small solutions of congruences to general modulus.
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