most recent 30 from http://mathoverflow.net 2013-05-25T09:58:01Z http://mathoverflow.net/feeds/question/103581 http://www.creativecommons.org/licenses/by-nc/2.5/rdf http://mathoverflow.net/questions/103581/diophantine-theory-of-homogeneous-cubic-polynomials Muon 2012-07-31T04:33:51Z 2012-10-13T03:29:22Z

<p>Arithmetic of quadratic forms over $\mathbb{Z}$ (or lattices theory) has received much attention and there are many applications in broad area of mathematics (such as intersection forms on fourfolds). I now wonder whether or not a similar theory for cubic forms can be developed. I recently found a beautiful theorem about binary cubic forms: </p> <blockquote> <p><strong>Theorem (B. N. Delone and D. K. Faddeev,W.-T. Gan, B. H. Gross, and G. Savin)</strong> There is a canonical bijection between isomorphism classes of cubic rings and the set of $GL_{2}(\mathbb{Z})$-equivalence classes of integral binary cubic forms. Under this bijection, the discriminant of a cubic ring is equal to the discriminant of the corresponding binary cubic form.</p> </blockquote> <p>I don't know how useful this theorem is because I don't know how difficult to classify cubic rings. My question is, are there any classification theory when the number of variable is small? I would appreciate it if anyone could give me a reference for recent development of cubic forms. </p>

http://mathoverflow.net/questions/103581/diophantine-theory-of-homogeneous-cubic-polynomials/109487#109487 Franz Lemmermeyer 2012-10-12T20:08:36Z 2012-10-13T03:29:22Z

<p>Let me begin with a historical comment. The correspondence between cubic rings and binary cubic forms that you mentioned is not due to Delone and Faddeev, but rather to F. Levi (Kubische Zahlk&ouml;rper und bin&auml;re kubische Formenklassen, Leipz. Ber. 66, 26-37 (1914); this article presents the results of Levi's thesis, which was supervised by Weber in 1911). Actually Delone and Faddeev credit Levi in their book not in the chapter where the material is presented but in the preface.</p> <p>BTW, Levi was Jewish and had to emigrate from Germany in 1936, when he went to the University of Calcutta and apparently was elected president of the Indian Mathematical Society for a few years. In 1949 he went to the Tata Institute, and he returned to Germany in 1952.</p> <p>Now for your question: there is a theory of cubic forms analogous to that of binary quadratic forms, which was developed by Eisenstein but abandoned after the success of Dedekind's ideal theory. The theory deals not with arbitrary cubic forms but only those that can be written as products of three linear factors (decomposable forms), and more specifically norm forms. For a modern account of the arithmetic of <em>binary</em> cubic forms you may want to look at Hoffman and Morales, Arithmetic of binary cubic forms, Enseign. Math. 46 (2000) 61-94.</p>