Add to ORKGChan, WK (reprint author), Wesleyan Univ, Dept Math & Comp Sci, Middletown, CT 06459 USALet 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 fo...
It is our basic question to study the following Diophantine equations (1.1) tXAX = B over the ring o...
AbstractWe establish a relationship between primitive representations of certain n-ary quadratic for...
In the present paper it is proved that if Q(x, y, z, t, u) is a real indefinite quadratic form of ty...
A positive definite ternary integral quadratic form is called regular if it represents all the posit...
An integral quadratic form is said to be strictly regular if it primitively represents all integers ...
In 1997 Jagy, Kaplansky and Schiemann determined that there are at most 913 (classes of) primitive, ...
Abstract. The purpose of this paper is to announce several results describing properties of the almo...
Let R be the ring of integers in a totally real quadratic field K. The purpose of the thesis is to s...
summary:For a ternary quadratic form over the rational numbers, we characterize the set of rational ...
Directed by Dr. Dan Yasaki. 53 pp. Let F be a real quadratic field with OF its ring of integers. Let...
Abstract. We consider the problem of classifying all positive-definite integer-valued quadratic form...
An integer of the form T-x = x(x+1)/2 for some positive integer x is called a triangular number. A t...
AbstractLet f be a quadratic form in n variables (n > 1) with nonzero determinant d. A prime p is sa...
Legendre first, and then Gauss, proved that f = x^2 + y^2 + z^2 represents every positive integer no...
AbstractLet V be a regular ternary quadratic space over the algebraic number field F, L a lattice on...
It is our basic question to study the following Diophantine equations (1.1) tXAX = B over the ring o...
AbstractWe establish a relationship between primitive representations of certain n-ary quadratic for...
In the present paper it is proved that if Q(x, y, z, t, u) is a real indefinite quadratic form of ty...
A positive definite ternary integral quadratic form is called regular if it represents all the posit...
An integral quadratic form is said to be strictly regular if it primitively represents all integers ...
In 1997 Jagy, Kaplansky and Schiemann determined that there are at most 913 (classes of) primitive, ...
Abstract. The purpose of this paper is to announce several results describing properties of the almo...
Let R be the ring of integers in a totally real quadratic field K. The purpose of the thesis is to s...
summary:For a ternary quadratic form over the rational numbers, we characterize the set of rational ...
Directed by Dr. Dan Yasaki. 53 pp. Let F be a real quadratic field with OF its ring of integers. Let...
Abstract. We consider the problem of classifying all positive-definite integer-valued quadratic form...
An integer of the form T-x = x(x+1)/2 for some positive integer x is called a triangular number. A t...
AbstractLet f be a quadratic form in n variables (n > 1) with nonzero determinant d. A prime p is sa...
Legendre first, and then Gauss, proved that f = x^2 + y^2 + z^2 represents every positive integer no...
AbstractLet V be a regular ternary quadratic space over the algebraic number field F, L a lattice on...
It is our basic question to study the following Diophantine equations (1.1) tXAX = B over the ring o...
AbstractWe establish a relationship between primitive representations of certain n-ary quadratic for...
In the present paper it is proved that if Q(x, y, z, t, u) is a real indefinite quadratic form of ty...