Automorphisms of Zero Divisor Graphs of Cube Radical Zero Completely Primary Finite Rings
Abstract
One of the most interesting areas of research that has attracted the attention of many scholars are theory of zero divisor graphs. Most recent research have focused on properties of zero divisor graphs with little attention given on the automorphsisms, despite the fact that automorphisms are useful in interpreting the symmetries of algebraic structure. Let R be a commutative unital finite rings and Z(R) be its set of zero divisors. In this study, the automorphisms zero divisor graphs of such rings in which the product of any three zero divisor is zero has been determined.
URI
https://doi.org/10.9734/jamcs/2020/v35i830316https://www.researchgate.net/publication/348004854_Automorphisms_of_Zero_Divisor_Graphs_of_Cube_Radical_Zero_Completely_Primary_Finite_Rings
http://ir-library.mmust.ac.ke:8080/xmlui/handle/123456789/1922
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