Abstract
Elementary Affine Logic (EAL) is a variant of Linear Logic characterizing the computational power of the elementary bounded Turing machines. The EAL Type Inference problem is the problem of automatically assigning to terms of λ-calculus EAL formulas as types. This problem, restricted to the propositional fragment of EAL, is proved to be decidable, and an algorithm is shown, building, for every λ-term, either a negative answer or a finite set of type schemata, from which all and only its typings can be derived, through suitable operations.
