A classification of cubic s-regular graphs of order 16p

“…Hence the structure of the vertex stabilizer of G v plays an important role in the study of (G, s)-transitive graphs. For example, benefitted from Djoković and Miller [4] result about the vertex stabilizer of cubic symmetric graphs, lots of works about classifications of cubic symmetric graphs were obtained by many authors (see [7], [8], [9], [23], [24]). Due to the vertex stabilizers given in [27], symmetric tetravalent graphs have also been studied extensively in the literature (see [11], [12], [22], [32], [34]).…”

Valency seven symmetric graphs of order $2pq$

“…Hence the structure of the vertex stabilizer of G v plays an important role in the study of (G, s)-transitive graphs. For example, benefitted from Djoković and Miller [4] result about the vertex stabilizer of cubic symmetric graphs, lots of works about classifications of cubic symmetric graphs were obtained by many authors (see [7], [8], [9], [23], [24]). Due to the vertex stabilizers given in [27], symmetric tetravalent graphs have also been studied extensively in the literature (see [11], [12], [22], [32], [34]).…”

Valency seven symmetric graphs of order $2pq$

Pentavalent symmetric graphs of order 16p

Cubic edge-transitive graphs of order $$2^np$$