THE DEGREE PROFILE AND GINI INDEX OF RANDOM CATERPILLAR TREES
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Publication:5056629
DOI10.1017/S0269964818000475WikidataQ128613456 ScholiaQ128613456MaRDI QIDQ5056629
Publication date: 8 December 2022
Published in: Probability in the Engineering and Informational Sciences (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1805.06328
stochastic recurrencePólya urn modeldegree profilegini indexMonte-Carlo experimentrandom caterpillar trees
Related Items (6)
ON SEVERAL PROPERTIES OF A CLASS OF PREFERENTIAL ATTACHMENT TREES—PLANE-ORIENTED RECURSIVE TREES ⋮ Several topological indices of random caterpillars ⋮ Investigating several fundamental properties of random lobster trees and random spider trees ⋮ DEGREE-BASED GINI INDEX FOR GRAPHS ⋮ On several properties of a class of hybrid recursive trees ⋮ Gini index on generalized \(r\)-partitions
Cites Work
- The total interval number of a tree and the Hamiltonian completion number of its line graph
- Martingale methods in financial modelling.
- Bivariate distributions generated from Pólya-Eggenberger urn models
- Graphs with only caterpillars as spanning trees
- The number of caterpillars
- Emergence of Scaling in Random Networks
- Polya Urn Models
- Strong convergence of proportions in a multicolor Pólya urn
- The Gini index of random trees with an application to caterpillars
- Some Hamiltonian results in powers of graphs
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