On the number of remainders in euclidean domains.Rajagopalan K., Markanda10 págs.Nivel analíticosemestra
noneThis Demonstration shows the connection between the continued fraction expansion of a rational n...
[[abstract]]Let M be a monic polynomial over some finite fields. For polynomials a with deg a<deg M ...
Let $K$ be an algebraic number field, and $\mathcal{O}_K$ the ring of integers of $K$. Let $X$ be a ...
A Euclidean ring such as the integers is equipped with an algorithm for division with remainder. In ...
Available from British Library Document Supply Centre- DSC:7673.7004(86/35) / BLDSC - British Librar...
AbstractA Euclidean ring such as the integers is equipped with span algorithm for division with rema...
Two results about the Euclidean algorithm (EA) for Gaussian integers are proven in this paper: first...
Euclidean moments of simply connected plane domains are investigated. The moments are defined as the...
Abstract. An inequality of Hardy type, with a remainder term, is proved for functions defined on a b...
This thesis provides the first unconditional proof that the ring Z&sqbl0;14&sqbr0; is a Euclidean do...
AbstractThough Euclidean domains are principal ideal domains, the converse is known to be false. We ...
We define the regular Euclidean algorithm and the general form which leads to the method of least ab...
For any given regular {p, q} tessellation in the hyperbolic plane, we compute the number of vertices...
The domain of approximation for v, denoted A(v), defines a relationship in Rd between a fixed ration...
AbstractBy establishing uniform convergence of some of Ramanujan's continued fractions, we are able ...
noneThis Demonstration shows the connection between the continued fraction expansion of a rational n...
[[abstract]]Let M be a monic polynomial over some finite fields. For polynomials a with deg a<deg M ...
Let $K$ be an algebraic number field, and $\mathcal{O}_K$ the ring of integers of $K$. Let $X$ be a ...
A Euclidean ring such as the integers is equipped with an algorithm for division with remainder. In ...
Available from British Library Document Supply Centre- DSC:7673.7004(86/35) / BLDSC - British Librar...
AbstractA Euclidean ring such as the integers is equipped with span algorithm for division with rema...
Two results about the Euclidean algorithm (EA) for Gaussian integers are proven in this paper: first...
Euclidean moments of simply connected plane domains are investigated. The moments are defined as the...
Abstract. An inequality of Hardy type, with a remainder term, is proved for functions defined on a b...
This thesis provides the first unconditional proof that the ring Z&sqbl0;14&sqbr0; is a Euclidean do...
AbstractThough Euclidean domains are principal ideal domains, the converse is known to be false. We ...
We define the regular Euclidean algorithm and the general form which leads to the method of least ab...
For any given regular {p, q} tessellation in the hyperbolic plane, we compute the number of vertices...
The domain of approximation for v, denoted A(v), defines a relationship in Rd between a fixed ration...
AbstractBy establishing uniform convergence of some of Ramanujan's continued fractions, we are able ...
noneThis Demonstration shows the connection between the continued fraction expansion of a rational n...
[[abstract]]Let M be a monic polynomial over some finite fields. For polynomials a with deg a<deg M ...
Let $K$ be an algebraic number field, and $\mathcal{O}_K$ the ring of integers of $K$. Let $X$ be a ...