The paper derives feedback conditions that violate topology identifiability for partial and full observations and proposes a distributed design that trades consensus deviation against topology privacy under limited budgets.
Kato,Perturbation theory for linear operators
2 Pith papers cite this work. Polarity classification is still indexing.
2
Pith papers citing it
years
2026 2verdicts
UNVERDICTED 2representative citing papers
Under a common dominant left eigenvector condition on logic matrices, signed multi-topic DeGroot-Friedkin dynamics reduce to scalar maps and converge globally to pluralistic, mixed, or vertex-dominant social power configurations while preserving interaction centrality ordering in the first two cases
citing papers explorer
-
Preserving Topology Privacy of Network Systems by Feedback: Conditions and Distributed Design
The paper derives feedback conditions that violate topology identifiability for partial and full observations and proposes a distributed design that trades consensus deviation against topology privacy under limited budgets.
-
Signed DeGroot-Friedkin Dynamics with Interdependent Topics
Under a common dominant left eigenvector condition on logic matrices, signed multi-topic DeGroot-Friedkin dynamics reduce to scalar maps and converge globally to pluralistic, mixed, or vertex-dominant social power configurations while preserving interaction centrality ordering in the first two cases