Span Program for Non-binary Functions

Abstract

Span programs characterize the quantum query complexity of binary functions f:\0,…,\n \0,1\ up to a constant factor. In this paper we generalize the notion of span programs for functions with non-binary input/output alphabets f: []n [m]. We show that non-binary span program characterizes the quantum query complexity of any such function up to a constant factor. We argue that this non-binary span program is indeed the generalization of its binary counterpart. We also generalize the notion of span programs for a special class of relations. Learning graphs provide another tool for designing quantum query algorithms for binary functions. In this paper, we also generalize this tool for non-binary functions, and as an application of our non-binary span program show that any non-binary learning graph gives an upper bound on the quantum query complexity.