We present a Curry–Howard correspondence for Gödel logic based on a simple natural deduction reformulating the hypersequent calculus for this logic. The resulting system extends simply typed λ-calculus by a symmetric higher-order communication mechanism between parallel processes. We discuss a normalisation procedure and several features of the parallel λ-calculus. Following A. Avron's 1991 thesis on the connection between hypersequents and parallelism, we also discuss the generalisation of the employed techniques for other intermediate logics.