We study two data structuring problems under the bit probe model: the dynamic predecessor problem and integer representation in a manner supporting basic updates in as few bit operations as possible. The model of computation considered in this paper is the bit probe model. In this model, the complexity measure counts only the bitwise accesses to the data structure. The model ignores the cost of computation. As a result, the bit probe complexity of a data structuring problem can be considered as a fundamental measure of the problem. Lower bounds derived by this model are valid as lower bounds for any realistic, sequential model of computation. Furthermore, some of the problems are more suitable for study in this model as they can be solved u...
We introduce new models for dynamic computation based on the cell probe model of Fredman and Yao. We...
In this work, we continue the examination of the role non-adaptivity plays in maintaining dynamic da...
We examine the problem of representing integers modulo L so that both increment and decrement operat...
A common problem in computer science is how to efficiently store sets: when given a set, how do you ...
AbstractThis work present several advances in the understanding of dynamic data structures in the bi...
We look at time-space tradeoffs for the static membership problem in the bit-probe model. The proble...
We consider the bit-probe complexity of the set membership problem: represent an n-element subset S ...
We study the following set membership problem in the bit probe model: given a set S from a finite un...
We present highly optimized data structures for the dynamic predecessor problem, where the task is t...
The bit probe complexity of a static data structure problem within a given size bound was defined b...
We present the first linear lower bound for the number of bits required to be accessed in the worst ...
In the cell probe model with word size 1 (the bit probe model), a static data structure problem is g...
AbstractWe consider time-space tradeoffs for static data structure problems in the cell probe model ...
AbstractWe consider a fundamental problem in data structures, static predecessor searching: Given a ...
We consider the problem of representing integers in close to optimal number of bits to support incre...
We introduce new models for dynamic computation based on the cell probe model of Fredman and Yao. We...
In this work, we continue the examination of the role non-adaptivity plays in maintaining dynamic da...
We examine the problem of representing integers modulo L so that both increment and decrement operat...
A common problem in computer science is how to efficiently store sets: when given a set, how do you ...
AbstractThis work present several advances in the understanding of dynamic data structures in the bi...
We look at time-space tradeoffs for the static membership problem in the bit-probe model. The proble...
We consider the bit-probe complexity of the set membership problem: represent an n-element subset S ...
We study the following set membership problem in the bit probe model: given a set S from a finite un...
We present highly optimized data structures for the dynamic predecessor problem, where the task is t...
The bit probe complexity of a static data structure problem within a given size bound was defined b...
We present the first linear lower bound for the number of bits required to be accessed in the worst ...
In the cell probe model with word size 1 (the bit probe model), a static data structure problem is g...
AbstractWe consider time-space tradeoffs for static data structure problems in the cell probe model ...
AbstractWe consider a fundamental problem in data structures, static predecessor searching: Given a ...
We consider the problem of representing integers in close to optimal number of bits to support incre...
We introduce new models for dynamic computation based on the cell probe model of Fredman and Yao. We...
In this work, we continue the examination of the role non-adaptivity plays in maintaining dynamic da...
We examine the problem of representing integers modulo L so that both increment and decrement operat...