Email this article HALF-FACTORIALITY IN SUBRINGS OF TRIGONOMETRIC POLYNOMIAL RINGS
Abstract
In this study we explore half-factorial domains in trigonometric polynomial
rings. Consider the ring $T^{\prime }$ of complex trigonometric polynomials.
(see \cite{PP}). We construct the half-factorial domains $T_{2}^{\prime },$ $%
T_{3}^{\prime }$ and $T_{4}^{\prime }$ which are the subrings of $T^{\prime }
$ such that $T_{2}^{\prime }\subseteq T_{3}^{\prime }\subseteq T_{4}^{\prime
}\subseteq T^{\prime }.$ We also discuss among these subrings the $Condition:
$ Let $A\subseteq B$ be a unitary (commutative) ring extension. For each $%
x\in B$ there exist $x^{\prime }\in U(B)$ and $x^{\prime \prime }\in A$ such
that $x=x^{\prime }x^{\prime \prime }.$
rings. Consider the ring $T^{\prime }$ of complex trigonometric polynomials.
(see \cite{PP}). We construct the half-factorial domains $T_{2}^{\prime },$ $%
T_{3}^{\prime }$ and $T_{4}^{\prime }$ which are the subrings of $T^{\prime }
$ such that $T_{2}^{\prime }\subseteq T_{3}^{\prime }\subseteq T_{4}^{\prime
}\subseteq T^{\prime }.$ We also discuss among these subrings the $Condition:
$ Let $A\subseteq B$ be a unitary (commutative) ring extension. For each $%
x\in B$ there exist $x^{\prime }\in U(B)$ and $x^{\prime \prime }\in A$ such
that $x=x^{\prime }x^{\prime \prime }.$
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PDF (Português (Brasil))DOI: https://doi.org/10.1590/S2179-84512013005000003
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Trends in Computational and Applied Mathematics
A publication of the Brazilian Society of Applied and Computational Mathematics (SBMAC)
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