Resolving and Exploiting the $k$-CFA Paradox (1311.4231v1)

Abstract: Low-level program analysis is a fundamental problem, taking the shape of "flow analysis" in functional languages and "points-to" analysis in imperative and object-oriented languages. Despite the similarities, the vocabulary and results in the two communities remain largely distinct, with limited cross-understanding. One of the few links is Shivers's $k$-CFA work, which has advanced the concept of "context-sensitive analysis" and is widely known in both communities. Recent results indicate that the relationship between the functional and object-oriented incarnations of $k$-CFA is not as well understood as thought. Van Horn and Mairson proved $k$-CFA for $k \geq 1$ to be EXPTIME-complete; hence, no polynomial-time algorithm can exist. Yet, there are several polynomial-time formulations of context-sensitive points-to analyses in object-oriented languages. Thus, it seems that functional $k$-CFA may actually be a profoundly different analysis from object-oriented $k$-CFA. We resolve this paradox by showing that the exact same specification of $k$-CFA is polynomial-time for object-oriented languages yet exponential- time for functional ones: objects and closures are subtly different, in a way that interacts crucially with context-sensitivity and complexity. This illumination leads to an immediate payoff: by projecting the object-oriented treatment of objects onto closures, we derive a polynomial-time hierarchy of context-sensitive CFAs for functional programs.