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In this paper we determine the group of rational automorphisms of binary cubic and quartic forms with integer coefficients and non-zero discriminant in terms of certain quadratic covariants of cubic and quartic forms. This allows one to…

Number Theory · Mathematics 2019-11-12 Stanley Yao Xiao

We prove that an additive form of degree $d=2m$, $m$ odd, $m\ge3$, over the unramified quadratic extension $\mathbb{Q}_2(\sqrt{5})$ has a nontrivial zero if the number of variables $s$ satisifies $s \ge 4d+1$. If $3 \nmid d$, then there…

Number Theory · Mathematics 2022-07-21 Drew Duncan , David B. Leep

For $A \subseteq \{1,2,\ldots\}$, we consider $R(A) = \{a/a' : a,a' \in A\}$. If $A$ is the set of nonzero values assumed by a quadratic form, when is $R(A)$ dense in the $p$-adic numbers? We show that for a binary quadratic form $Q$,…

Number Theory · Mathematics 2021-02-05 Christopher Donnay , Stephan Ramon Garcia , Jeremy Rouse

In this paper, we will interest in finding the number of zeros of the quadratic forms over finite fields. We will apply the tool for finding the number of rational points of supersingular curves in [6]. We will give some more tools for…

Algebraic Geometry · Mathematics 2020-01-15 Emrah Seran Yılmaz

We prove that a nodal quartic threefold $X$ containing no planes is $Q$-factorial provided that it has not more than 12 singular points, with the exception of a quartic with exactly 12 singularities containing a quadric surface. We give…

Algebraic Geometry · Mathematics 2008-03-31 Constantin Shramov

Let $f$ be a positive definite (non-classic) integral quaternary quadratic form. We say $f$ is strongly $s$-regular if it satisfies a regularity property on the number of representations of squares of integers. In this article, we prove…

Number Theory · Mathematics 2019-03-07 Kyoungmin Kim

We consider the problem of classifying all positive-definite integer-valued quadratic forms that represent all positive odd integers. Kaplansky considered this problem for ternary forms, giving a list of 23 candidates, and proving that 19…

Number Theory · Mathematics 2018-01-22 Jeremy Rouse

In this paper, we prove a quantitative version of the statement that every nonempty finite subset of $\mathbb{N}^+$ is a set of quadratic residues for infinitely many primes of the form $[n^c]$ with $1\leqslant c\leqslant243/205$.…

Number Theory · Mathematics 2012-02-07 Ping Xi

We give formulas for the number of representations of non negative integers by various quadratic forms. We also give evaluations in the case of sum of two cubes (cubic case) and the quintic case, as well. We introduce a class of generalized…

General Mathematics · Mathematics 2015-04-30 Nikos Bagis , M. L Glasser

The equivariant nonnegativity versus sums of squares question has been solved for any infinite series of essential reflection groups but type A. As a first step to a classification, we analyse $A_n$-invariant quartics. We prove that the…

Algebraic Geometry · Mathematics 2024-02-07 Sebastian Debus , Charu Goel , Salma Kuhlmann , Cordian Riener

Using half-integral weight modular forms we give a criterion for the existence of real quadratic $p$-rational fields. For $p=5$ we prove the existence of infinitely many real quadratic $p$-rational fields.

Number Theory · Mathematics 2019-06-11 Jilali Assim , Zakariae Bouazzaoui

Given $A\subseteq \mathbb{Z}$, the ratio set or the quotient set of $A$ is defined by $R(A):=\{a/b: a, b\in A, b\neq 0\}$. It is an open problem to study the denseness of $R(A)$ in the $p$-adic numbers when $A$ is the set of values attained…

Number Theory · Mathematics 2025-09-23 Deepa Antony , Rupam Barman , Stevan Gajović , Daniel Širola

We propose polynomial-time algorithms for finding nontrivial zeros of quadratic forms with four variables over rational function fields of characteristic 2. We apply these results to find prescribed quadratic subfields of quaternion…

Number Theory · Mathematics 2022-03-09 Tímea Csahók , Péter Kutas , Mickaël Montessinos , Gergely Zábrádi

We determine the minimal number of variables $\Gamma^*(d, K)$ which guarantees a nontrivial solution for every additive form of degree $d=4$ over the four ramified quadratic extensions $\mathbb{Q}_2(\sqrt{2}), \mathbb{Q}_2(\sqrt{10}),…

Number Theory · Mathematics 2021-12-22 Drew Duncan , David B. Leep

A polynomial transformation of the real plane $\Bbb R^2$ is a mapping $\Bbb R^2\to\Bbb R^2$ given by two polynomials of two variables. Such a transformation is called cubic if the degrees of its polynomials are not greater than three. It…

Algebraic Geometry · Mathematics 2015-08-13 Ruslan Sharipov

We provide a sufficient condition for solvability of a system of real quadratic equations $p_i(x)=y_i$, $i=1, \ldots, m$, where $p_i: {\mathbb R}^n \longrightarrow {\mathbb R}$ are quadratic forms. By solving a positive semidefinite…

Optimization and Control · Mathematics 2021-10-05 Alexander Barvinok , Mark Rudelson

For non-singular intersections of pairs of quadrics in 11 or more variables, we prove an asymptotic for the number of rational points in an expanding box.

Number Theory · Mathematics 2015-07-29 Ritabrata Munshi

We show that the maximal number of (real) lines in a (real) nonsingular spatial quartic surface is 64 (respectively, 56). We also give a complete projective classification of all quartics containing more than 52 lines: all such quartics are…

Algebraic Geometry · Mathematics 2017-06-20 Alex Degtyarev , Ilia Itenberg , Ali Sinan Sertöz

A (positive definite and non-classic integral) quadratic form is called strongly $s$-regular if it satisfies a strong regularity property on the number of representations of squares of integers. In this article, we prove that for any…

Number Theory · Mathematics 2019-09-05 Kyoungmin Kim , Byeong-Kweon Oh

We study the singular series associated to a cubic form with integer coefficients. If the number of variables is at least $10$, we prove the absolute convergence (and hence positivity) under the assumption of Davenport's Geometric…

Number Theory · Mathematics 2023-10-04 Christian Bernert