On Independence Number of Comaximal Subgroup Graph

Abstract

In this paper, we establish sharp thresholds on the independence number of the comaximal subgroup graph (G) that guarantee solvability, supersolvability, and nilpotency of the underlying group G. Specifically: itemize For solvability, we prove that any group G with independence number α((G))≤ 51 must be solvable, and show that the alternating group A5 is uniquely determined by its graph. For supersolvability, we show that α((G))≤ 14 implies G is supersolvable, except for three explicit exceptions. For nilpotency, we prove that α((G))≤ 6 ensures nilpotency, except for five groups. itemize Finally, we conclude with some open issues involving domination parameters.