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edited Feb 4, 2020 at 7:30

Algebraic Structuresstructures on Graphsgraphs

There are many algebraic structures linked to graphs.

For example one can find Zero Divisor Graphs\cite{1}zero divisor graphs $[1]$, Cayley Graphs \cite{2}$[2]$ and many other graphs.

Does there exist any survey paper which characterizes all the graphs obtained till now from algebraic structures?

If someone could provide any survey article which can give some light, I will be grateful

Anderson, D.F. and Livingston, P.S., 1999. The zero-divisor graph of a commutative ring. Journal of Algebra, 217(2), pp.434-447.

Babai, L., 1979. Spectra of Cayley graphs. Journal of Combinatorial Theory, Series B, 27(2), pp.180-189.

$[1]$ Anderson, D.F. and Livingston, P.S., 1999. The zero-divisor graph of a commutative ring. Journal of Algebra, 217(2), pp.434-447.

$[2]$ Babai, L., 1979. Spectra of Cayley graphs. Journal of Combinatorial Theory, Series B, 27(2), pp.180-189.

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asked Feb 4, 2020 at 3:54

There are many algebraic structures linked to graphs.

For example one can find Zero Divisor Graphs\cite{1}, Cayley Graphs \cite{2} and many other graphs.

Does there exist any survey paper which characterizes all the graphs obtained till now from algebraic structures?

If someone could provide any survey article which can give some light, I will be grateful

Anderson, D.F. and Livingston, P.S., 1999. The zero-divisor graph of a commutative ring. Journal of Algebra, 217(2), pp.434-447.
Babai, L., 1979. Spectra of Cayley graphs. Journal of Combinatorial Theory, Series B, 27(2), pp.180-189.