The LMO Spectrum: Factorization Homology and the E3-Structure of the Jacobi Diagram Algebra

Abstract

We define the LMO spectrum, a categorification of the Le-Murakami-Ohtsuki (LMO) invariant for 3-manifolds, using factorization homology. The theoretical foundation is our main algebraic result (Theorem A): the algebra of Jacobi diagrams, , possesses a homotopy E3-algebra structure. This is a necessary condition for consistency within factorization homology, and the proof relies on the formality of the little 3-disks operad. A universal surgery formula is derived from the excision axiom (Theorem B), providing a computational basis independent of conjectural models. As an application (Theorem C), we construct an ``H1-decorated LMO invariant'' that distinguishes the lens spaces L(156, 5) and L(156, 29), a pair that the classical LMO invariant fails to separate.