Stabilizing Graph Algorithms - 8 Angebote vergleichen
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Stabilizing Graph Algorithms (2016)
DE PB NW RP
ISBN: 9783659804243 bzw. 365980424X, in Deutsch, LAP Lambert Academic Publishing Aug 2016, Taschenbuch, neu, Nachdruck.
Lieferung aus: Deutschland, Versandkostenfrei.
Von Händler/Antiquariat, AHA-BUCH GmbH [51283250], Einbeck, Germany.
This item is printed on demand - Print on Demand Neuware - A distributed system consists of a set of loosely connected processes that do not share a global memory. The task of many open distributed systems is to guarantee an invariance relationship over the states of the system, and the states of the environment influencing that system. When the invariant holds, the state of the system is legal; otherwise it is illegal. Occasionally, the actions of the environment perturbs the state of the system and puts it into an illegal state-this is viewed as a transient failure. A self-stabilizing system guarantees that, regardless of the current state, the system returns to a legal state in a bounded number of steps. Due to this property, self-stabilizing systems can beused to deal with variety of faults in distributed systems. This dissertation deals with devising self-stabilizing distributed systems for a variety of graph theoretic problems. These include graph coloring, center and median finding, and maxima finding problems. The proposed solutions tolerate dynamic changes in the topology of the network. 80 pp. Englisch.
Von Händler/Antiquariat, AHA-BUCH GmbH [51283250], Einbeck, Germany.
This item is printed on demand - Print on Demand Neuware - A distributed system consists of a set of loosely connected processes that do not share a global memory. The task of many open distributed systems is to guarantee an invariance relationship over the states of the system, and the states of the environment influencing that system. When the invariant holds, the state of the system is legal; otherwise it is illegal. Occasionally, the actions of the environment perturbs the state of the system and puts it into an illegal state-this is viewed as a transient failure. A self-stabilizing system guarantees that, regardless of the current state, the system returns to a legal state in a bounded number of steps. Due to this property, self-stabilizing systems can beused to deal with variety of faults in distributed systems. This dissertation deals with devising self-stabilizing distributed systems for a variety of graph theoretic problems. These include graph coloring, center and median finding, and maxima finding problems. The proposed solutions tolerate dynamic changes in the topology of the network. 80 pp. Englisch.
2
Symbolbild
Stabilizing Graph Algorithms (2016)
DE PB NW
ISBN: 9783659804243 bzw. 365980424X, in Deutsch, LAP Lambert Academic Publishing Aug 2016, Taschenbuch, neu.
Lieferung aus: Deutschland, Versandkostenfrei.
Von Händler/Antiquariat, Agrios-Buch [57449362], Bergisch Gladbach, Germany.
Neuware - A distributed system consists of a set of loosely connected processes that do not share a global memory. The task of many open distributed systems is to guarantee an invariance relationship over the states of the system, and the states of the environment influencing that system. When the invariant holds, the state of the system is legal; otherwise it is illegal. Occasionally, the actions of the environment perturbs the state of the system and puts it into an illegal state-this is viewed as a transient failure. A self-stabilizing system guarantees that, regardless of the current state, the system returns to a legal state in a bounded number of steps. Due to this property, self-stabilizing systems can beused to deal with variety of faults in distributed systems. This dissertation deals with devising self-stabilizing distributed systems for a variety of graph theoretic problems. These include graph coloring, center and median finding, and maxima finding problems. The proposed solutions tolerate dynamic changes in the topology of the network. 80 pp. Englisch.
Von Händler/Antiquariat, Agrios-Buch [57449362], Bergisch Gladbach, Germany.
Neuware - A distributed system consists of a set of loosely connected processes that do not share a global memory. The task of many open distributed systems is to guarantee an invariance relationship over the states of the system, and the states of the environment influencing that system. When the invariant holds, the state of the system is legal; otherwise it is illegal. Occasionally, the actions of the environment perturbs the state of the system and puts it into an illegal state-this is viewed as a transient failure. A self-stabilizing system guarantees that, regardless of the current state, the system returns to a legal state in a bounded number of steps. Due to this property, self-stabilizing systems can beused to deal with variety of faults in distributed systems. This dissertation deals with devising self-stabilizing distributed systems for a variety of graph theoretic problems. These include graph coloring, center and median finding, and maxima finding problems. The proposed solutions tolerate dynamic changes in the topology of the network. 80 pp. Englisch.
3
Stabilizing Graph Algorithms
DE HC NW
ISBN: 9783659804243 bzw. 365980424X, in Deutsch, Lap Lambert Academic Publishing, gebundenes Buch, neu.
Lieferung aus: Deutschland, Versandkostenfrei innerhalb von Deutschland.
A distributed system consists of a set of loosely connected processes that do not share a global memory. The task of many open distributed systems is to guarantee an invariance relationship over the states of the system, and the states of the environment influencing that system. When the invariant holds, the state of the system is legal; otherwise it is illegal. Occasionally, the actions of the environment perturbs the state of the system and puts it into an illegal state-this is viewed as a A distributed system consists of a set of loosely connected processes that do not share a global memory. The task of many open distributed systems is to guarantee an invariance relationship over the states of the system, and the states of the environment influencing that system. When the invariant holds, the state of the system is legal; otherwise it is illegal. Occasionally, the actions of the environment perturbs the state of the system and puts it into an illegal state-this is viewed as a transient failure. A self-stabilizing system guarantees that, regardless of the current state, the system returns to a legal state in a bounded number of steps. Due to this property, self-stabilizing systems can beused to deal with variety of faults in distributed systems. This dissertation deals with devising self-stabilizing distributed systems for a variety of graph theoretic problems. These include graph coloring, center and median finding, and maxima finding problems. The proposed solutions tolerate dynamic changes in the topology of the network. Lieferzeit 1-2 Werktage.
A distributed system consists of a set of loosely connected processes that do not share a global memory. The task of many open distributed systems is to guarantee an invariance relationship over the states of the system, and the states of the environment influencing that system. When the invariant holds, the state of the system is legal; otherwise it is illegal. Occasionally, the actions of the environment perturbs the state of the system and puts it into an illegal state-this is viewed as a A distributed system consists of a set of loosely connected processes that do not share a global memory. The task of many open distributed systems is to guarantee an invariance relationship over the states of the system, and the states of the environment influencing that system. When the invariant holds, the state of the system is legal; otherwise it is illegal. Occasionally, the actions of the environment perturbs the state of the system and puts it into an illegal state-this is viewed as a transient failure. A self-stabilizing system guarantees that, regardless of the current state, the system returns to a legal state in a bounded number of steps. Due to this property, self-stabilizing systems can beused to deal with variety of faults in distributed systems. This dissertation deals with devising self-stabilizing distributed systems for a variety of graph theoretic problems. These include graph coloring, center and median finding, and maxima finding problems. The proposed solutions tolerate dynamic changes in the topology of the network. Lieferzeit 1-2 Werktage.
4
Stabilizing Graph Algorithms
~EN NW AB
ISBN: 9783659804243 bzw. 365980424X, vermutlich in Englisch, neu, Hörbuch.
Lieferung aus: Schweiz, Lieferzeit: 2 Tage, zzgl. Versandkosten.
A distributed system consists of a set of loosely connected processes that do not share a global memory. The task of many open distributed systems is to guarantee an invariance relationship over the states of the system, and the states of the environment influencing that system. When the invariant holds, the state of the system is legal, otherwise it is illegal. Occasionally, the actions of the environment perturbs the state of the system and puts it into an illegal state-this is viewed as a transient failure. A self-stabilizing system guarantees that, regardless of the current state, the system returns to a legal state in a bounded number of steps. Due to this property, self-stabilizing systems can beused to deal with variety of faults in distributed systems. This dissertation deals with devising self-stabilizing distributed systems for a variety of graph theoretic problems. These include graph coloring, center and median finding, and maxima finding problems. The proposed solutions tolerate dynamic changes in the topology of the network.
A distributed system consists of a set of loosely connected processes that do not share a global memory. The task of many open distributed systems is to guarantee an invariance relationship over the states of the system, and the states of the environment influencing that system. When the invariant holds, the state of the system is legal, otherwise it is illegal. Occasionally, the actions of the environment perturbs the state of the system and puts it into an illegal state-this is viewed as a transient failure. A self-stabilizing system guarantees that, regardless of the current state, the system returns to a legal state in a bounded number of steps. Due to this property, self-stabilizing systems can beused to deal with variety of faults in distributed systems. This dissertation deals with devising self-stabilizing distributed systems for a variety of graph theoretic problems. These include graph coloring, center and median finding, and maxima finding problems. The proposed solutions tolerate dynamic changes in the topology of the network.
5
Stabilizing Graph Algorithms
~EN PB NW
ISBN: 9783659804243 bzw. 365980424X, vermutlich in Englisch, LAP Lambert Academic Publishing, Taschenbuch, neu.
Lieferung aus: Deutschland, Versandkostenfrei.
Stabilizing Graph Algorithms: A distributed system consists of a set of loosely connected processes that do not share a global memory. The task of many open distributed systems is to guarantee an invariance relationship over the states of the system, and the states of the environment influencing that system. When the invariant holds, the state of the system is legal otherwise it is illegal. Occasionally, the actions of the environment perturbs the state of the system and puts it into an illegal state-this is viewed as a transient failure. A self-stabilizing system guarantees that, regardless of the current state, the system returns to a legal state in a bounded number of steps. Due to this property, self-stabilizing systems can beused to deal with variety of faults in distributed systems. This dissertation deals with devising self-stabilizing distributed systems for a variety of graph theoretic problems. These include graph coloring, center and median finding, and maxima finding problems. The proposed solutions tolerate dynamic changes in the topology of the network. Englisch, Taschenbuch.
Stabilizing Graph Algorithms: A distributed system consists of a set of loosely connected processes that do not share a global memory. The task of many open distributed systems is to guarantee an invariance relationship over the states of the system, and the states of the environment influencing that system. When the invariant holds, the state of the system is legal otherwise it is illegal. Occasionally, the actions of the environment perturbs the state of the system and puts it into an illegal state-this is viewed as a transient failure. A self-stabilizing system guarantees that, regardless of the current state, the system returns to a legal state in a bounded number of steps. Due to this property, self-stabilizing systems can beused to deal with variety of faults in distributed systems. This dissertation deals with devising self-stabilizing distributed systems for a variety of graph theoretic problems. These include graph coloring, center and median finding, and maxima finding problems. The proposed solutions tolerate dynamic changes in the topology of the network. Englisch, Taschenbuch.
6
Symbolbild
Stabilizing Graph Algorithms
DE PB NW
ISBN: 9783659804243 bzw. 365980424X, in Deutsch, Taschenbuch, neu.
Lieferung aus: Deutschland, Versandkostenfrei.
Von Händler/Antiquariat, English-Book-Service Mannheim [1048135], Mannheim, Germany.
Publisher/Verlag: LAP Lambert Academic Publishing | A distributed system consists of a set of loosely connected processes that do not share a global memory. The task of many open distributed systems is to guarantee an invariance relationship over the states of the system, and the states of the environment influencing that system. When the invariant holds, the state of the system is legal; otherwise it is illegal. Occasionally, the actions of the environment perturbs the state of the system and puts it into an illegal state-this is viewed as a transient failure. A self-stabilizing system guarantees that, regardless of the current state, the system returns to a legal state in a bounded number of steps. Due to this property, self-stabilizing systems can beused to deal with variety of faults in distributed systems. This dissertation deals with devising self-stabilizing distributed systems for a variety of graph theoretic problems. These include graph coloring, center and median finding, and maxima finding problems. The proposed solutions tolerate dynamic changes in the topology of the network. | Format: Paperback | Language/Sprache: english | 80 pp.
Von Händler/Antiquariat, English-Book-Service Mannheim [1048135], Mannheim, Germany.
Publisher/Verlag: LAP Lambert Academic Publishing | A distributed system consists of a set of loosely connected processes that do not share a global memory. The task of many open distributed systems is to guarantee an invariance relationship over the states of the system, and the states of the environment influencing that system. When the invariant holds, the state of the system is legal; otherwise it is illegal. Occasionally, the actions of the environment perturbs the state of the system and puts it into an illegal state-this is viewed as a transient failure. A self-stabilizing system guarantees that, regardless of the current state, the system returns to a legal state in a bounded number of steps. Due to this property, self-stabilizing systems can beused to deal with variety of faults in distributed systems. This dissertation deals with devising self-stabilizing distributed systems for a variety of graph theoretic problems. These include graph coloring, center and median finding, and maxima finding problems. The proposed solutions tolerate dynamic changes in the topology of the network. | Format: Paperback | Language/Sprache: english | 80 pp.
7
Stabilizing Graph Algorithms
~EN PB NW
ISBN: 365980424X bzw. 9783659804243, vermutlich in Englisch, LAP Lambert Academic Publishing, Taschenbuch, neu.
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