The implicit dictionary problem is that of maintaining a dynamic ordered set, S, under the operations search, insert and delete, so that the elements of S are stored in the first |S| locations of an array. No operations are permitted on the data other than comparisons (≤) and interchanges. The only auxiliary memory permitted is a constant number of O(log |S|) bit integers. The organization will, then, rely heavily on the permutations of the relative order of the values in which the data is stored. While such a structure can be maintained in O(log |S|) time, the most interesting lower bound on the topic is that of Borodin, Fich, Meyer auf der Heide, Upfal and Wigderson [3]. They proved a tradeoff between search and update time in implicit dictionaries: if the update cost (comparisons and exchanges) is O(1), then the search cost must be Ω(|S|ε), for some constant ε 0. The authors left open thequestion of whether such a tradeoff would hold if only the modifications performed during an update were considered. They conjectured that any implicit dictionary performing only O(1) exchanges per update should very quickly become "disorganized", and so require Ω(|S|ε) comparisons per search. We answer this long-standing open question by disproving the conjecture.
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机译:隐式字典问题是在搜索,插入和删除操作下维护动态有序集 S ,以便将 S 的元素存储在第一个| S |数组的位置。除了比较(≤)和互换以外,不允许对数据进行任何操作。唯一允许的辅助存储器是恒定数量的 O (log | S |)位整数。然后,组织将在很大程度上依赖于存储数据的值的相对顺序的排列。虽然可以在 O (log | S |)时间内维护这种结构,但该主题上最有趣的下限是Borodin,Fich,Meyer auf der Heide的下限,Upfal和Wigderson [3]。他们证明了隐式词典在搜索和更新时间之间进行折衷:如果更新成本(比较和交换)为 O (1),则搜索成本必须为Ω( | S | ε),对于某些常数ε>0。作者只提出了一个问题,即如果仅考虑更新过程中执行的修改,是否可以保持这种折衷。他们认为,每次更新仅执行 O (1)交换的任何隐式词典都应该很快变得“混乱”,因此需要Ω(| S | ε< / SUP>)每次搜索的比较。我们通过反证猜想来回答这个长期存在的问题。
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