Homological Algebra Of - Semimodules And Semicont...

The "Semicontinuity" aspect typically refers to the behavior of dimensions (like the rank of a semimodule) under deformations.

Constructing resolutions using free semimodules or injective envelopes (like the "max-plus" analogues of vector spaces). Homological Algebra of Semimodules and Semicont...

It connects to the Lusternik-Schnirelmann category in idempotent analysis, where semicontinuity helps track the stability of eigenvalues in max-plus linear systems. 4. Applications: Tropical Geometry The "Semicontinuity" aspect typically refers to the behavior