In general, a **node** is a localised swelling (a "knot") or a point of intersection (a vertex).

Node may refer to:

Read more about Node: In Mathematics, In Computing and Electronics, In Science, In Music, Other Uses

### Other articles related to "node, nodes":

Bidirectional Search - Description - Terminology and Notation

... the branching factor of a search tree the cost associated with moving from

... the branching factor of a search tree the cost associated with moving from

**node**to**node**the cost from the root to the**node**the heuristic estimate of the ... It is from this set that a**node**is chosen for expansion ... In this metaphor, a 'collision' occurs when, during the expansion phase, a**node**from one wavefront is found to have successors in the opposing ...Koorde - Routing Example

... when a message needs to be routed from

... when a message needs to be routed from

**node**“2” (which is “010”) to “6” (which is “110”), the steps are following Step 1)**Node**#2 routes the message to ... Step 2)**Node**#5 routes the message to**Node**#3 (using its connection to 2i+1 mod8), shifts the bits left and puts “1” as the youngest bit (right side) ... Step 3)**Node**#3 routes the message to**Node**#6 (using its connection to 2i mod8), shifts the bits left and puts “0” as the youngest bit (right side) ...Koorde - De Bruijn's Graphs

... de Bruijn graph, there are 2d

... de Bruijn graph, there are 2d

**nodes**, each of which has a unique d-bit ID ... The**node**with ID i is connected to**nodes**2i modulo 2d and 2i+1 modulo 2d ... Routing a message from**node**m to**node**k is accomplished by taking the number m and shifting in the bits of k one at a time until the number has been replaced by k ...**Node**- Other Uses

...

**Node**tribe, a community of pastoral nomads in India and Pakistan

**Node**, a stop in a transportation system

**Node**4-Giordana Racing, a British cycling team

**Node**Magazine, a literary project based on the novel Spook ...

Bethe Lattice

... see below), introduced by Hans Bethe in 1935, is a connected cycle-free graph where each

... see below), introduced by Hans Bethe in 1935, is a connected cycle-free graph where each

**node**is connected to z neighbours, where z is called the coordination number ... structure emanating from a central**node**, with all the**nodes**arranged in shells around the central one ... The central**node**may be called the root or origin of the lattice ...Related Subjects

Related Phrases

Related Words