Information as an Evaluation Identity

This paper identifies information as a system-level property in the Modal-Dependence Calculus by equating it with the evaluation operator that determines structural admissibility. A structure contains information if and only if all of its elements possess defined dependence paths terminating at a common core. The analysis shows that information is a binary state determined entirely by element-level definability and that the absence of such definability in any element yields a global failure of information. This failure state is invariant under extension, demonstrating that increasing the size or breadth of a structure does not generate information. The results establish information as a structural condition rather than a function of scale, complexity, or accumulation.