2024-07-022024-07-022020-01-010354-5180https://doi.org/10.2298/FIL2002615Thttps://hdl.handle.net/11452/42697Bu çalışma, 26-29 Ekim 2018 tarihleri arasında Antalya[Türkiye]’da düzenlenen 1. Mediterranean International Conference of Pure and Applied Mathematics and Related Areas (MICOPAM)’da bildiri olarak sunulmuştur.Due to their applications in many branches of science, topological graph indices are becoming more popular every day. Especially as one can model chemical molecules by graphs to obtain valuable information about the molecules using solely mathematical calculations on the graph. The inverse problem for topological graph indices is a recent problem proposed by Gutman and is about the existence of a graph having its index value equal to a given non-negative integer. In this paper, the inverse problem for Bell index which is one of the irregularity indices is solved. Also a recently defined graph invariant called omega invariant is used to obtain several properties related to the Bell index.eninfo:eu-repo/semantics/closedAccessIrregularityInverse problemBell indexOmega invariantScience & technologyPhysical sciencesMathematics, appliedMathematicsMathematicsArticle000595329700039615621342, Special Issue SI10.2298/FIL2002615T