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Uniqueness polynomials for entire curves into complex projective space
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Tran Van Tan
Published/Copyright:
September 25, 2009
Summary
In this article we find a new class of uniqueness polynomials for entire curves into complex projective space. Moreover, we also prove that the zero set of every polynomial in the above-mentioned class is a hyperbolic hypersurface in the sense of Kobayashi and has the arithmetic finiteness property.
Published Online: 2009-09-25
Published in Print: 2005-12-01
© Oldenbourg Wissenschaftsverlag GmbH
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Articles in the same Issue
- Inequalities for the hyperbolic tangent
- Analytic integrals and Poincaré's centre problem
- Generalized partition functions and subgroup growth of free products of nilpotent groups
- Uniqueness polynomials for entire curves into complex projective space
- On a fourth order Steklov eigenvalue problem
- Conformal measures for non-entire functions with critical values eventually mapped onto infinity
Keywords for this article
uniqueness polynomial;
hyperbolic hypersurface;
arithmetic finiteness property
Articles in the same Issue
- Inequalities for the hyperbolic tangent
- Analytic integrals and Poincaré's centre problem
- Generalized partition functions and subgroup growth of free products of nilpotent groups
- Uniqueness polynomials for entire curves into complex projective space
- On a fourth order Steklov eigenvalue problem
- Conformal measures for non-entire functions with critical values eventually mapped onto infinity
