ECCENTRIC DISTANCE SUM OF SUBSTITUTION TREE NETWORKS
From MaRDI portal
Publication:5025000
DOI10.1142/S0218348X21501474zbMath1491.28010OpenAlexW3160964185MaRDI QIDQ5025000
Publication date: 1 February 2022
Published in: Fractals (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1142/s0218348x21501474
eccentric distance sumself-similar measurefractal networkaverage geodesic distancesubstitution network
Related Items (1)
Cites Work
- Unnamed Item
- On the eccentric distance sum of graphs
- A generalized finite type condition for iterated function systems
- Asymptotic formula on average path length of fractal networks modeled on Sierpinski gasket
- Application of graph theory: Relationship of eccentric connectivity index and Wiener's index with anti-inflammatory activity
- Some further results on the eccentric distance sum
- Eccentric distance sum: A novel graph invariant for predicting biological and physical properties
- On the minimum eccentric distance sum of bipartite graphs with some given parameters
- HAUSDORFF DIMENSION OF SELF-SIMILAR SETS WITH OVERLAPS
- The exact solution of the mean geodesic distance for Vicsek fractals
- AVERAGE GEODESIC DISTANCE OF SIERPINSKI GASKET AND SIERPINSKI NETWORKS
- ASYMPTOTIC FORMULA OF ECCENTRIC DISTANCE SUM FOR VICSEK NETWORK
- ASYMPTOTIC FORMULA ON AVERAGE PATH LENGTH OF A SPECIAL NETWORK BASED ON SIERPINSKI CARPET
- ECCENTRIC DISTANCE SUM OF SIERPIŃSKI GASKET AND SIERPIŃSKI NETWORK
- AVERAGE GEODESIC DISTANCE ON SIERPINSKI HEXAGON AND SIERPINSKI HEXAGON NETWORKS
- AVERAGE DISTANCE OF SUBSTITUTION NETWORKS
- SMALL-WORLD AND SCALE-FREE PROPERTIES OF FRACTAL NETWORKS MODELED ON n-DIMENSIONAL SIERPINSKI PYRAMID
- AVERAGE GEODESIC DISTANCE OF SIERPINSKI CARPET
- AVERAGE DISTANCE OF SELF-SIMILAR FRACTAL TREES
- On the extremal values of the eccentric distance sum of trees
This page was built for publication: ECCENTRIC DISTANCE SUM OF SUBSTITUTION TREE NETWORKS
