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U. Michigan participation in EDIN Lada Adamic, PI. E 2.1 fractional immunization of networks E 2.1 time series analysis approach to correlating structure and content, and co-evolving structure E 2.3 role of groups in information diffusion E 2.3 cultural differences in communication structure. - PowerPoint PPT Presentation
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U. Michigan participation in EDINLada Adamic, PI
• E 2.1 fractional immunization of networks• E 2.1 time series analysis approach to correlating structure
and content, and co-evolving structure • E 2.3 role of groups in information diffusion• E 2.3 cultural differences in communication structure
INARC
2
Fractional Immunization in Hospital-transfer Graphs B. Aditya Prakash1, Lada A. Adamic2, Theodore Iwashyna2, Hanghang
Tong3, Christos Faloutsos1
1Carnegie Melon University, 2University of Michigan,3IBM
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hospital setting
• Hospitals harbor highly resistant bacteria• These bacteria can hitch a ride when patients are transferred
from hospital to hospital
communication network setting
• individuals may propagate misinformation or malicious computer viruses
two settings
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one problem
complete immunization is not feasible
• all prior work on immunization on networks assumes complete immunization
our approach: fractional immunization
• allocating resources to nodes reduces their probability of becoming infected
• e.g. allocating r units of resource corresponds to reducing Prob(infection) to
€
(0.75)r
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Fractional Asymmetric Immunization
• Fractional Effect• Asymmetric Effect
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Fractional Asymmetric Immunization
Fractional Effect [ f(x) = ]• Asymmetric Effect
Edge weakened by half
x5.0
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Fractional Asymmetric Immunization
Fractional Effect [ f(x) = ] Asymmetric EffectOnly incoming edges
x5.0
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Fractional Asymmetric Immunization
• Fractional Effect [ f(x) = ]• Asymmetric Effect
# antidotes = 3
x5.0
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Fractional Asymmetric Immunization
• Fractional Effect [ f(x) = ]• Asymmetric Effect
# antidotes = 3
x5.0
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Fractional Asymmetric Immunization
• Fractional Effect [ f(x) = ]• Asymmetric Effect
# antidotes = 3
x5.0
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Problem Statement
• Hospital-transfer networks – Number of patients transferred
• Given:– The SI model– Directed weighted graph – A total of k antidotes– A weakening function f(x)
• Find: – the ‘best’ distribution which minimizes the “footprint” at some time t
Naïve way
• How to estimate the footprint?– Run simulations? – too slow– takes about 3 weeks for graphs of typical size!
Our Solution – Main Idea
• The SI model has no threshold– any infection will become an epidemic
• But– can bound the expected number of infected nodes at time t
• Get the distribution which minimizes the bound!
Our Solution – Main Idea
• NP-complete!• We give a fast, effective near-optimal algorithm -
GreedyResync– O(km/r + kN)
Simulations
Lower is better
Our algorithm, near optimal
US-MEDICARE Hospital Patient Transfer network
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simulation results
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Resource allocation
few ICU beds
many ICU beds
fewer resources
more resources
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fractional immunization: summary
• Targeted resource allocation is 16x more effective than uniform
• Best strategy: heavily concentrate resources at a few particularly important hospitals
• Greedy algorithm is near-optimal
Time series analysis of network co-evolution
• Can the evolution of network structure reveal attributes of the content?– imagine that pattern of who communicates with whom is easy to
discern, but acquiring content is costly (paying informant, decrypting, etc.)
– Can the structure suggest when it would be appropriate to • Can the evolution of one network predict how another
network over the same nodes will evolve in the future?
Chun-Yuen Teng, Liuling Gong, Avishay Livne, Lada Adamic
Twitter data
contemporaneous correlation between structure and content
predicting the similarity between non-linked pairs using textual and structural variables
correlation between textual and structural features
measuring co-evolution
• temporal conductance– degree of unexpectedness– recent and frequent edges, or those that close recent and frequent
paths, are expected
• Second Life data:– low conductance (network is novel) corresponds to lower entropy in
exchanged assets– “free” asset transfer network time series predicts, via temporal
conductance, paid transaction time series
The role of groups in information diffusion
• Main findings:– group variables help to explain adoption
• e.g. overlap of groups an individual and previous adopters belong to• group variables are more predictive than # of adopting contacts, etc.
– group structure is predictive of amount of exchange• e.g. higher clustering
David Huffaker, Chun-Yuen Teng, Liuling Gong, Matthew Simmons, Lada Adamic
group structure conducive to exchange
low rates of adoption
high ratesof adoption
cultural differences in co-evolving communication patterns
• corporate communication– In Asia, individuals use different channels for different contacts
Jiang Yang1, Zhen Wen2, Lada Adamic1, Mark Ackerman1
1U. Michigan, 2IBM
cultural differences in sentiment expression
