A Theory of Changes for Higher-Order Languages - Incrementalizing {\lambda}-Calculi by Static Differentiation
Abstract
If the result of an expensive computation is invalidated by a small change to the input, the old result should be updated incrementally instead of reexecuting the whole computation. We incrementalize programs through their derivative. A derivative maps changes in the program's input directly to changes in the program's output, without reexecuting the original program. We present a program transformation taking programs to their derivatives, which is fully static and automatic, supports first-class functions, and produces derivatives amenable to standard optimization. We prove the program transformation correct in Agda for a family of simply-typed {\lambda}-calculi, parameterized by base types and primitives. A precise interface specifies what is required to incrementalize the chosen primitives. We investigate performance by a case study: We implement in Scala the program transformation, a plugin and improve performance of a nontrivial program by orders of magnitude.
Cite
@article{arxiv.1312.0658,
title = {A Theory of Changes for Higher-Order Languages - Incrementalizing {\lambda}-Calculi by Static Differentiation},
author = {Yufei Cai and Paolo G. Giarrusso and Tillmann Rendel and Klaus Ostermann},
journal= {arXiv preprint arXiv:1312.0658},
year = {2013}
}
Comments
11 pages; unpublished preprint, under submission