Flows over time (also called dynamic flows) generalize standard network flows by introducing an element of time. They naturally model problems where travel and transmission are not instantaneous. Traditionally, flows over time are solved in time‐expanded networks that contain one copy of the original network for each discrete time step. While this method makes available the whole algorithmic toolbox developed for static flows, its main and often fatal drawback is the enormous size of the time‐expanded network. We present several approaches for coping with this difficulty. First, inspired by the work of Ford and Fulkerson on maximal s‐t‐flows over time (or “maximal dynamic s‐t‐flows”), we show that static length‐bounded flows lead to provabl...
We introduce temporal flows on temporal networks. We show that one can find the maximum amount of fl...
We introduce temporal flows on temporal networks [17, 19], i.e., networks the links of which exist o...
"August 1999."Includes bibliographical references (p. 10-11).by Lisa K. Fleischer [and] James B. Orl...
Abstract. Flows over time (also called dynamic flows) generalize standard network flows by introduci...
Flows over time (also called dynamic flows) generalize standard network flows by introducing an elem...
Traditionally, flows over time are solved in time expanded networks which contain one copy of the or...
AbstractFlow variation over time is an important feature in network flow problems arising in various...
Given a network with capacities and transit times on the arcs, the quickest flow problem asks for a ...
Flow variation over time is an important feature in network flow problems arising in various applica...
Flows over time (dymanic flows) generalize standard network flows by introducing a new element- time...
Flow variation over time is an important feature in network flow problems arising in various applica...
In the 1950’s, Ford and Fulkerson introduced dynamic flows by incorporating the notion of time into ...
Flow variation over time is an important feature in network flow problems arising in various applica...
This thesis addresses the earliest arrival flow problem, defined on dynamic networks with several so...
Temporal dynamics is a crucial feature of network flow problems occurring in many practical applicat...
We introduce temporal flows on temporal networks. We show that one can find the maximum amount of fl...
We introduce temporal flows on temporal networks [17, 19], i.e., networks the links of which exist o...
"August 1999."Includes bibliographical references (p. 10-11).by Lisa K. Fleischer [and] James B. Orl...
Abstract. Flows over time (also called dynamic flows) generalize standard network flows by introduci...
Flows over time (also called dynamic flows) generalize standard network flows by introducing an elem...
Traditionally, flows over time are solved in time expanded networks which contain one copy of the or...
AbstractFlow variation over time is an important feature in network flow problems arising in various...
Given a network with capacities and transit times on the arcs, the quickest flow problem asks for a ...
Flow variation over time is an important feature in network flow problems arising in various applica...
Flows over time (dymanic flows) generalize standard network flows by introducing a new element- time...
Flow variation over time is an important feature in network flow problems arising in various applica...
In the 1950’s, Ford and Fulkerson introduced dynamic flows by incorporating the notion of time into ...
Flow variation over time is an important feature in network flow problems arising in various applica...
This thesis addresses the earliest arrival flow problem, defined on dynamic networks with several so...
Temporal dynamics is a crucial feature of network flow problems occurring in many practical applicat...
We introduce temporal flows on temporal networks. We show that one can find the maximum amount of fl...
We introduce temporal flows on temporal networks [17, 19], i.e., networks the links of which exist o...
"August 1999."Includes bibliographical references (p. 10-11).by Lisa K. Fleischer [and] James B. Orl...