Paper Info
Title
Factoring analytic multivariate polynomials and non-standard Cauchy-Riemann conditions.
Abstract
Motivated by previous work on the simplification of parametrizations of curves, in this paper we generalize the well-known notion of analytic polynomial (a bivariate polynomial P(x, y), with complex coefficients, which arises by substituting z→x+iy on a univariate polynomial p(z)∈ℂ[z], i.e. p(z)→p(x+iy)=P(x, y)) to other finite field extensions, beyond the classical case of ℝ⊂ℂ. In this general setting we obtain different properties on the factorization, gcd's and resultants of analytic polynomials, which seem to be new even in the context of Complex Analysis. Moreover, we extend the well-known Cauchy–Riemann conditions (for harmonic conjugates) to this algebraic framework, proving that the new conditions also characterize the components of generalized analytic polynomials.
Year
DOI
Venue
2014
10.1016/j.matcom.2013.03.013
Mathematics and Computers in Simulation
Keywords
Field
DocType
Cauchy–Riemann conditions,Analytic polynomials,Hankel matrix,Factorization
Discrete mathematics,Finite field,Algebraic number,Polynomial,Mathematical analysis,Cauchy–Riemann equations,Factorization,Univariate,Mathematics,Factorization of polynomials,Difference polynomials
Journal
Volume
ISSN
Citations 
104
0378-4754
2
PageRank 
References 
Authors
0.43
4
4
Name
Order
Citations
PageRank
Tomás Recio130742.06
J. Rafael Sendra262168.33
Luis Felipe Tabera3294.24
Carlos Villarino4558.42