Ordered algebra

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In mathematics, an ordered algebra is an algebra over the real numbers ${\displaystyle ℝ}$ with unit e together with an associated order such that e is positive (i.e. e ≥ 0), the product of any two positive elements is again positive, and when A is considered as a vector space over ${\displaystyle ℝ}$ then it is an Archimedean ordered vector space.

Let A be an ordered algebra with unit e and let C^* denote the cone in A^* (the algebraic dual of A) of all positive linear forms on A. If f is a linear form on A such that f(e) = 1 and f generates an extreme ray of C^* then f is a multiplicative homomorphism.Template:Sfn

Stone's Algebra Theorem:Template:Sfn Let A be an ordered algebra with unit e such that e is an order unit in A, let A^* denote the algebraic dual of A, and let K be the ${\displaystyle \sigma (A^{*},A)}$-compact set of all multiplicative positive linear forms satisfying f(e) = 1. Then under the evaluation map, A is isomorphic to a dense subalgebra of ${\displaystyle C_{ℝ}(X)}$. If in addition every positive sequence of type l¹ in A is order summable then A together with the Minkowski functional p_e is isomorphic to the Banach algebra ${\displaystyle C_{ℝ}(X)}$.

• Ordered vector space
• Riesz space

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