In this paper, we consider the representation and management of an element set on which a lattice partial order relation is defined. In particular, let n be the element set size. We present an O(n root n)-space implicit data structure for performing the following set of basic operations: 1. Test the presence of an order relation between two given elements, in constant time. 2. Find a path between two elements whenever one exists, in O(l) steps, where l is the path length. 3. Compute the successors and/or predecessors set of a given element, in O(h) steps, where h is the size of the returned set. 4. Given two elements, find all elements between them, in time O(k log d), where k is the size of the returned set and d is the maximum in-degree o...
The lattice Ais an important lattice because of its covering properties in low dimensions. Two algor...
The lattice A*n is an important lattice because of its covering properties in low dimensions. Two al...
We consider the problem of partial order production: arrange the elements of an unknown totally orde...
In this paper, we consider the representation and management of an element set on which a lattice pa...
In this paper, we consider the representation and management of an element set on which a lattice ...
In this paper, we present an implicit data structure for the representation of a partial lattice L =...
AbstractIn this paper, we present an implicit data structure for the representation of a partial lat...
In this paper, we present an implicit data structure for the representation of a partial lattice $...
In this paper, we introduce an implicit data structure which represents a forest-structured partial ...
AbstractFrom a well-known decomposition theorem, we propose a tree representation for distributive a...
This thesis considers the study of data structures from the perspective of the theoretician, with a ...
Data structures are vital entities that strongly impact the efficiency of several software applicati...
We consider the problem of efficiently representing sets S of size n from an ordered universe U = {0...
This paper presents an encoding algorithm to enable fast computation of the least upper bound (LUB) ...
We consider the problem of efficiently representing sets S of size n from an ordered universe U = {0...
The lattice Ais an important lattice because of its covering properties in low dimensions. Two algor...
The lattice A*n is an important lattice because of its covering properties in low dimensions. Two al...
We consider the problem of partial order production: arrange the elements of an unknown totally orde...
In this paper, we consider the representation and management of an element set on which a lattice pa...
In this paper, we consider the representation and management of an element set on which a lattice ...
In this paper, we present an implicit data structure for the representation of a partial lattice L =...
AbstractIn this paper, we present an implicit data structure for the representation of a partial lat...
In this paper, we present an implicit data structure for the representation of a partial lattice $...
In this paper, we introduce an implicit data structure which represents a forest-structured partial ...
AbstractFrom a well-known decomposition theorem, we propose a tree representation for distributive a...
This thesis considers the study of data structures from the perspective of the theoretician, with a ...
Data structures are vital entities that strongly impact the efficiency of several software applicati...
We consider the problem of efficiently representing sets S of size n from an ordered universe U = {0...
This paper presents an encoding algorithm to enable fast computation of the least upper bound (LUB) ...
We consider the problem of efficiently representing sets S of size n from an ordered universe U = {0...
The lattice Ais an important lattice because of its covering properties in low dimensions. Two algor...
The lattice A*n is an important lattice because of its covering properties in low dimensions. Two al...
We consider the problem of partial order production: arrange the elements of an unknown totally orde...