Finiteness results for regular definite ternary quadratic forms over Q(√5)

被引：4

作者：

Chan, Wai Kiu ^{[1
]}

Earnest, A. G. ^{[2
]}

Icaza, Maria Ines ^{[3
]}

Kim, Ji Young ^{[4
]}

机构：

[1] Wesleyan Univ, Dept Math & Comp Sci, Middletown, CT 06459 USA

[2] So Illinois Univ, Dept Math, Carbondale, IL 62901 USA

[3] Univ Talca, Inst Mat & Fis, Talca, Chile

[4] Seoul Natl Univ, Dept Math, Seoul 151747, South Korea

来源：

INTERNATIONAL JOURNAL OF NUMBER THEORY | 2007年 / 3卷 / 04期

关键词：

regular quadratic forms over Q(root 5);

D O I：

10.1142/S1793042107001103

中图分类号：

O1 [数学];

学科分类号：

0701 ; 070101 ;

摘要：

Let o be the ring of integers in a number field. An integral quadratic form over o is called regular if it represents all integers in o that are represented by its genus. In [13,14] Watson proved that there are only finitely many inequivalent positive definite primitive integral regular ternary quadratic forms over Z. In this paper, we generalize Watson's result to totally positive regular ternary quadratic forms over Z[1+root 5/2]. We also show that the same finiteness result holds for totally positive definite spinor regular ternary quadratic forms over Z[1+root 5/2], and thus extends the corresponding finiteness results for spinor regular quadratic forms over Z obtained in [ 1,3].

引用

页码：541 / 556

页数：16

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