Complex numbers in 5 dimensions
Abstract
A system of commutative complex numbers in 5 dimensions of the form u=x0+h1x1+h2x2+h3x3+h4x4 is described in this paper, the variables x0, x1, x2, x3, x4 being real numbers. The operations of addition and multiplication of the 5-complex numbers introduced in this work have a geometric interpretation based on the the modulus d, the amplitude , the polar angle θ+, the planar angle 1, and the azimuthal angles φ1,φ2. The exponential function of a 5-complex number can be expanded in terms of polar 5-dimensional cosexponential functions g5k(y), k=0,1,2,3,4, and the expressions of these functions are obtained from the properties of the exponential function of a 5-complex variable. Exponential and trigonometric forms are obtained for the 5-complex numbers, which depend on the modulus, the amplitude and the angular variables. The 5-complex functions defined by series of powers are analytic, and the partial derivatives of the components of the 5-complex functions are closely related. The integrals of 5-complex functions are independent of path in regions where the functions are regular. The fact that the exponential form of the 5-complex numbers depends on the cyclic variables φ1, φ2 leads to the concept of pole and residue for integrals on closed paths. The polynomials of 5-complex variables can be written as products of linear or quadratic factors.
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