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Transactions of the American Mathematical Society

Published by the American Mathematical Society since 1900, Transactions of the American Mathematical Society is devoted to longer research articles in all areas of pure and applied mathematics.

ISSN 1088-6850 (online) ISSN 0002-9947 (print)

The 2020 MCQ for Transactions of the American Mathematical Society is 1.48.

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The logarithmic limit-set of an algebraic variety
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by George M. Bergman PDF
Trans. Amer. Math. Soc. 157 (1971), 459-469 Request permission

Abstract:

Let $C$ be the field of complex numbers and $V$ a subvariety of ${(C - \{ 0\} )^n}$. To study the “exponential behavior of $V$ at infinity", we define $V_\infty ^{(a)}$ as the set of limitpoints on the unit sphere ${S^{n - 1}}$ of the set of real $n$-tuples $({u_x}\log |{x_1}|, \ldots ,{u_x}\log |{x_n}|)$, where $x \in V$ and ${u_x} = {(1 + \Sigma {(\log |{x_i}|)^2})^{ - 1/2}}$. More algebraically, in the case of arbitrary base-field $k$ we can look at places “at infinity” on $V$ and use the values of the associated valuations on ${X_1}, \ldots ,{X_n}$ to construct an analogous set $V_\infty ^{(b)}$. Thirdly, simply by studying the terms occurring in elements of the ideal $I$ defining $V$, we define another closely related set, $V_\infty ^{(c)}$. These concepts are introduced to prove a conjecture of A. E. Zalessky on the action of $GL(n,Z)$ on $k[X_1^{ \pm 1}, \ldots ,X_n^{ \pm 1}]$, then studied further. It is shown among other things that $V_\infty ^{(b)} = V_\infty ^{(c)} \supseteq$ (when defined) $V_\infty ^{(a)}$. If a certain natural conjecture is true, then equality holds where we wrote “$\supseteq$", and the common set ${V_\infty } \subseteq {S^{n - 1}}$ is a finite union of convex spherical polytopes.
References
  • Dnestrovskaya tetrad′: Nereshennye zadachi teorii kolets i moduleĭ, Redakcionno-Izdat. Otdel Akad. Nauk Moldav. SSR, Kishinev, 1969 (Russian). First All-Union Symposium on the Theory of Rings and Modules (Kishinev, 1968). MR 0254084
  • George M. Bergman, A weak Nullstellensatz for valuations, Proc. Amer. Math. Soc. 28 (1971), 32–38. MR 272780, DOI 10.1090/S0002-9939-1971-0272780-1
    • D. Mumford, Introduction to algebraic geometry, Department of Mathematics, Harvard University, Cambridge, Mass., 1966 (preliminary version of first three chapters). M. Raynaud, Modèles de Néron, C. R. Acad. Sci. Paris Sér. A-B 262 (1966), A345-A347. MR 33 #2631.
  • Oscar Zariski and Pierre Samuel, Commutative algebra. Vol. II, The University Series in Higher Mathematics, D. Van Nostrand Co., Inc., Princeton, N.J.-Toronto-London-New York, 1960. MR 0120249
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Additional Information
  • © Copyright 1971 American Mathematical Society
  • Journal: Trans. Amer. Math. Soc. 157 (1971), 459-469
  • MSC: Primary 14.01
  • DOI: https://doi.org/10.1090/S0002-9947-1971-0280489-8
  • MathSciNet review: 0280489