Convex Subalgebras and Convex Spectral Topology on Autometrized Algebras.

In the development of the theory of autometrized algebra, various types of research have been conducted. However, there are some properties like convex subalgebra, prime convex subalgebra, meet closed sets, regular convex subalgebra, and convex spectral topology on autometrized algebras that have not been studied yet. In this paper, we define the notions of convex subalgebras and congruence relations on an autometrized algebra. We demonstrate that the collection of all convex subalgebras of an autometrized algebra forms a lattice and distributive. In particular, we will show that there exists a one-to-one correspondence between the set of all convex subalgebras and the set of all congruences on an np-autometrized algebra. Furthermore, we explore prime convex subalgebras, meet closed subsets, and regular convex subalgebras and obtain some related results. For instance, we show that in a semiregular np-autometrized l-algebra, the intersection of a chain of prime convex subalgebra is a prime convex subalgebra. We also prove that any convex subalgebra in an autometrized algebra is the intersection of regular convex subalgebras. Lastly, we introduce the convex spectral topology of proper prime convex subalgebras in an autometrized l-algebra and discuss some fundamental facts. We also prove that a convex spectrum is compact in an np-autometrized l-algebra A if and only if A is generated by some element. Specifically, we demonstrate that the convex spectrum is a T1 - space and Hausdorff space. [ABSTRACT FROM AUTHOR]