The primary objective of this article is to extend the fundamental concepts of ring theory to the setting of uniform HX rings and elucidate the structural differences between classical rings and these newly defined algebraic systems. By positioning uniform HX rings within the broader framework of hyperalgebra, this study seeks to advance the generalization of algebraic structures characterized by multivalued operations and contribute to the theoretical expansion of the field. To achieve this aim, this paper introduces and systematically analyzes the notions of subalgebraic structures and the product of uniform HX rings. It investigates the conditions under which these constructions preserve uniformity and examines several algebraic properties that arise from their interaction. Particular emphasis is placed on HX ideals, the images and pre-images of which are characterized through homomorphisms defined between uniform HX rings. This approach not only clarifies the behavior of ideals under structure-preserving mappings but also provides a solid foundation for subsequent theoretical developments. A further objective of this study is to generalize the concept commonly studied as hyperrings in the hyperalgebraic literature. After formally presenting the definition of uniform HX rings, this article establishes their existence through carefully constructed examples, thereby demonstrating the mathematical viability of the proposed structure. Building on this foundation, key properties of uniform HX rings are identified, revealing both their parallels with and departures from classical ring theory. Moreover, HX ring homomorphisms are defined to support the formulation of algebraic structure theorems and illuminate the relationships among uniform HX rings. These mappings play a central role in understanding structural correspondences within the theory. This article culminates in the presentation of a fundamental theorem that ensures a one-to-one correspondence between specific algebraic objects, thereby reinforcing the theoretical framework and offering a basis for future research in hyperalgebra and related areas.