Question

The Barabasí-Albert model generates networks with an approximate form of this property. For 10 points each:
[10h] Give this property of systems that look the same under arbitrary magnification, which is stronger than self-similarity. Many real-world networks, like the Internet, are assumed to have an approximate form of this property, characterized by a few highly-connected hubs.
ANSWER: scale-invariant [accept scale-free network; accept, but DO NOT REVEAL, power law network]
[10m] These functions are the only scale-invariant functions, so they characterize the degree distribution of scale-free networks and fluctuations in systems at phase transitions. These functions take the form “C times x to the negative alpha.”
ANSWER: power laws
[10e] Power law distributions for observables are characteristic of physical states with this property. A “point” named for this property lies at the endpoint of a phase boundary, at which liquid and vapor are indistinguishable.
ANSWER: critical [accept critical point]
<VD, Physics>

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2023 ARCADIA at UC BerkeleyPremiereY225.00100%50%100%
2023 ARCADIA at Carleton UniversityPremiereY36.6767%0%0%
2023 ARCADIA at Claremont CollegesPremiereY110.00100%0%0%
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Data

Chicago AIllinois B001010
Illinois AChicago B001010
Purdue AIndiana001010
Notre Dame ANotre Dame B001010
Purdue BVanderbilt001010