Extensible Recursive Functions, Algebraically

Abstract: We explore recursive programming with extensible data types. Row types make the structure of data types first class, and can express a variety of type system features from subtyping to modular combination of case branches. Our goal is the modular combination of recursive types and of recursive functions over them. The most significant challenge is in recursive function calls, which may need to account for new cases in a combined type. We introduce bounded algebras, Mendler-style descriptions of recursive functions in which recursive calls can happen at larger types, and show that they provide expressive recursion over extensible data types. We formalize our approach in R$\omega\mu$, a small extension of an existing row type theory with support for recursive terms and types, and mechanize the metatheory of R$\omega\mu$ via an embedding in Agda