Consider a random graph G(N, p) with P = 2. е -1/N √N + 3N Therefore the random graph O has not O has a giant component in the limit N In the limit N → ∞o the average degree (k) is given by O ∞ O O O 2 O None of the above ∞0.

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
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Chapter2: Second-order Linear Odes
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Consider a random graph G(N, p) with
P = 2.
е
-1/N
√N + 3N
Therefore the random graph
O has not O has
a giant component in the limit N
In the limit N → ∞o the average degree (k) is given by
O ∞ O O O 2 O None of the above
∞0.
Transcribed Image Text:Consider a random graph G(N, p) with P = 2. е -1/N √N + 3N Therefore the random graph O has not O has a giant component in the limit N In the limit N → ∞o the average degree (k) is given by O ∞ O O O 2 O None of the above ∞0.
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