Tight Bounds and Phase Transitions for Incremental and Dynamic Retrieval

Abstract

Retrieval data structures are data structures that answer key-value queries without paying the space overhead of explicitly storing keys. The problem can be formulated in four settings (static, value-dynamic, incremental, or dynamic), each of which offers different levels of dynamism to the user. In this paper, we establish optimal bounds for the final two settings (incremental and dynamic) in the case of a polynomial universe. Our results complete a line of work that has spanned more than two decades, and also come with a surprise: the incremental setting, which has long been viewed as essentially equivalent to the dynamic one, actually has a phase transition, in which, as the value size v approaches n, the optimal space redundancy actually begins to shrink, going from roughly n n (which has long been thought to be optimal) all the way down to (n) (which is the optimal bound even for the seemingly much-easier value-dynamic setting).

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