AbstractThe design and analysis of algorithms for on-line dynamic storage allocation has been a fundamental problem area in computer science for many years. In this paper we study the stochastic behavior of dynamic allocation algorithms under the natural assumption that files enter and leave the system according to a Poisson process. In particular, we prove that for any dynamic allocation algorithm and any distribution of file sizes, the expected wasted space (or fragmentation) in the system at any time is Ω(√N √log log N), where N is the expected number of items (or used space) in the system. This result is known to be tight in the special case when all files have the same size. More importantly, we also construct a dynamic allocation algo...
Recent research in combinatorial bin-packing models is extended to a stochastic model in which an ar...
We consider a version in continuous time of the parking problem of Knuth. Files arrive following a P...
We consider the following stochastic bin packing process: the items arrive continuously over time to...
AbstractThe design and analysis of algorithms for on-line dynamic storage allocation has been a fund...
We study a model of dynamic storage allocation in which requests for single units of memory arrive i...
In this paper we first consider the one-dimensional bin-packing problem and show that a class of "an...
. This paper is concerned with on-line storage allocation to processes in a dynamic environment. Thi...
We analyze a dynamic queue-storage problem where the arrival and departure processes are those of th...
In this report, we look at the problem of packing a number of arrays in memory efficiently. This is ...
In this report, we look at the problem of packing a number of arrays in memory efficiently. This is ...
We analyse a storage process with dynamical arrivals and departures. Under probabilistic assumptions...
AbstractWe analyze a dynamic queue-storage problem where the arrival and departure processes are tho...
ory allocation analyse the distributions of allocated and free blocks under random alloca-tions and ...
(eng) We study of the average case performance of the Best Fit algorithm for on-line bin packing und...
In this thesis, a storage model with infinite capacity, additive stochastic input and unit release p...
Recent research in combinatorial bin-packing models is extended to a stochastic model in which an ar...
We consider a version in continuous time of the parking problem of Knuth. Files arrive following a P...
We consider the following stochastic bin packing process: the items arrive continuously over time to...
AbstractThe design and analysis of algorithms for on-line dynamic storage allocation has been a fund...
We study a model of dynamic storage allocation in which requests for single units of memory arrive i...
In this paper we first consider the one-dimensional bin-packing problem and show that a class of "an...
. This paper is concerned with on-line storage allocation to processes in a dynamic environment. Thi...
We analyze a dynamic queue-storage problem where the arrival and departure processes are those of th...
In this report, we look at the problem of packing a number of arrays in memory efficiently. This is ...
In this report, we look at the problem of packing a number of arrays in memory efficiently. This is ...
We analyse a storage process with dynamical arrivals and departures. Under probabilistic assumptions...
AbstractWe analyze a dynamic queue-storage problem where the arrival and departure processes are tho...
ory allocation analyse the distributions of allocated and free blocks under random alloca-tions and ...
(eng) We study of the average case performance of the Best Fit algorithm for on-line bin packing und...
In this thesis, a storage model with infinite capacity, additive stochastic input and unit release p...
Recent research in combinatorial bin-packing models is extended to a stochastic model in which an ar...
We consider a version in continuous time of the parking problem of Knuth. Files arrive following a P...
We consider the following stochastic bin packing process: the items arrive continuously over time to...