AbstractThe purpose of this paper is to show how the problem of finding roots (or zeros) of the monic quaternionic quadratic polynomials (MQQP) can be solved by its equivalent real quadratic form. The real quadratic form matrices, firstly defined in this paper, are used to form a simple equivalent real quadratic form of MQQP. Some necessary and sufficient conditions for the existence of roots of MQQP are also presented. The main idea of the practical method proposed in this work can be summarized in two steps: translating MQQP into its equivalent real quadratic form, and giving directly the quaternionic roots of MQQP by solving its equivalent real quadratic form
In this paper, we establish the formulas of the extermal ranks of the quaternion matrix expression f...
This paper presents an algorithm in finding the real roots of the general quintic polynomial equatio...
The purpose of this paper is to show how the problem of finding the zeros of unilateral n-order quat...
AbstractThe purpose of this paper is to show how the problem of finding roots (or zeros) of the moni...
AbstractIn this paper, we derive explicit formulas for computing the roots of a quaternionic quadrat...
The scalar-vector representation is used to derive a simple algorithm to obtain the roots of a quadr...
In this paper we derive explicit formulas for computing the roots of a quadratic polynomial with coe...
AbstractA method is developed to compute the zeros of a quaternion polynomial with all terms of the ...
In this paper we focus on the study of monic polynomials whose coefficients are quaternions located ...
A method is proposed with which the locations of the roots of the monic symbolic quintic polynomial ...
A method is developed to compute the zeros of a quaternion polynomial with all terms of the form qkX...
In this note we present a new method for determining the roots of a quartic polynomial, wherein the ...
A method is proposed with which the locations of the roots of the monic symbolic quintic polynomial ...
In this paper we determine the sets of spherical roots, real roots, isolated complex roots, pure im...
In this paper, we establish the solvability conditions and the formula of the general solution to a ...
In this paper, we establish the formulas of the extermal ranks of the quaternion matrix expression f...
This paper presents an algorithm in finding the real roots of the general quintic polynomial equatio...
The purpose of this paper is to show how the problem of finding the zeros of unilateral n-order quat...
AbstractThe purpose of this paper is to show how the problem of finding roots (or zeros) of the moni...
AbstractIn this paper, we derive explicit formulas for computing the roots of a quaternionic quadrat...
The scalar-vector representation is used to derive a simple algorithm to obtain the roots of a quadr...
In this paper we derive explicit formulas for computing the roots of a quadratic polynomial with coe...
AbstractA method is developed to compute the zeros of a quaternion polynomial with all terms of the ...
In this paper we focus on the study of monic polynomials whose coefficients are quaternions located ...
A method is proposed with which the locations of the roots of the monic symbolic quintic polynomial ...
A method is developed to compute the zeros of a quaternion polynomial with all terms of the form qkX...
In this note we present a new method for determining the roots of a quartic polynomial, wherein the ...
A method is proposed with which the locations of the roots of the monic symbolic quintic polynomial ...
In this paper we determine the sets of spherical roots, real roots, isolated complex roots, pure im...
In this paper, we establish the solvability conditions and the formula of the general solution to a ...
In this paper, we establish the formulas of the extermal ranks of the quaternion matrix expression f...
This paper presents an algorithm in finding the real roots of the general quintic polynomial equatio...
The purpose of this paper is to show how the problem of finding the zeros of unilateral n-order quat...