queueing theory

Queueing theory is the mathematical study of waiting lines, or queues.

In queueing theory a model is constructed so that queue lengths and waiting times can be predicted.

Fable about a controversy in queueing theory over operational analysis.

A matrix scheme is also an example of an 'exploding queue' in queueing theory.

He became one of the first to introduce semi-Markov processes in queueing theory (1952).

He is an expert in queueing theory.

Queueing theory has grown far more sophisticated.

Queueing Systems is a peer-reviewed scientific journal covering queueing theory.

In computer science and queueing theory this refers to the way items stored in some types of data structures are processed.

Queueing theory is generally considered a branch of operations research because the results are often used when making business decisions about the resources needed to provide service.

Approaches inspired by these ideas have seen applications in epidemic models, queueing theory, computer network performance and game theory.

He defined Kendall's notation for queueing theory.

After World War II queueing theory became an area of research interest to mathematicians.

The assumptions of classical queueing theory may be too restrictive to be able to model real-world situations exactly.

In queueing theory, it determines the remaining time, that a newly arriving customer to a non-empty queue has to wait until being served.

Queueing theory is a branch of mathematics in which models of queueing systems have been developed.

In queueing theory , Markovian arrival processes are used to model the arrival of customers to a queue.

In queueing theory, a Kelly network is a general multiclass queueing network.

The term LCFS ("last come, first served") is sometimes used in queueing theory.

"Anyone seeking an introduction to queueing theory..."

Agner Krarup Erlang first published on this model in 1909, starting the subject of queueing theory.

His research focuses on queueing theory, performance analysis, stochastic models of telecommunication systems, and numerical transform inversion.

Geometric series are used throughout mathematics, and they have important applications in physics, engineering, biology, economics, computer science, queueing theory, and finance.

Performance engineering relies heavily on statistics, queueing theory and probability theory for its tools and processes.

He worked in particular on point processes and their application in queueing theory and branching processes.