Babai's problem

Unsolved problem in mathematics:

Which finite groups are BI-groups?

(more unsolved problems in mathematics)

Babai's problem is a problem in algebraic graph theory first proposed in 1979 by László Babai.^[1]

Babai's problem

Let ${\displaystyle G}$  be a finite group, let ${\displaystyle \operatorname {Irr} (G)}$  be the set of all irreducible characters of ${\displaystyle G}$ , let ${\displaystyle \Gamma =\operatorname {Cay} (G,S)}$  be the Cayley graph (or directed Cayley graph) corresponding to a generating subset ${\displaystyle S}$  of ${\displaystyle G\setminus \{1\}}$ , and let ${\displaystyle \nu }$  be a positive integer. Is the set

${\displaystyle M_{\nu }^{S}=\left\{\sum _{s\in S}\chi (s)\;|\;\chi \in \operatorname {Irr} (G),\;\chi (1)=\nu \right\}}$ 

an invariant of the graph ${\displaystyle \Gamma }$ ? In other words, does ${\displaystyle \operatorname {Cay} (G,S)\cong \operatorname {Cay} (G,S')}$  imply that ${\displaystyle M_{\nu }^{S}=M_{\nu }^{S'}}$ ?

BI-group

A finite group ${\displaystyle G}$  is called a BI-group (Babai Invariant group)^[2] if ${\displaystyle \operatorname {Cay} (G,S)\cong \operatorname {Cay} (G,T)}$  for some inverse closed subsets ${\displaystyle S}$  and ${\displaystyle T}$  of ${\displaystyle G\setminus \{1\}}$  implies that ${\displaystyle M_{\nu }^{S}=M_{\nu }^{T}}$  for all positive integers ${\displaystyle \nu }$ .

Open problem

Which finite groups are BI-groups?^[3]

See also

• List of unsolved problems in mathematics
• List of problems solved since 1995

References

1. Babai, László (October 1979), "Spectra of Cayley graphs", Journal of Combinatorial Theory, Series B, 27 (2): 180–189, doi:10.1016/0095-8956(79)90079-0
2. Abdollahi, Alireza; Zallaghi, Maysam (10 February 2019). "Non-Abelian finite groups whose character sums are invariant but are not Cayley isomorphism". Journal of Algebra and Its Applications. 18 (1): 1950013. arXiv:1710.04446. doi:10.1142/S0219498819500130.
3. Abdollahi, Alireza; Zallaghi, Maysam (24 August 2015). "Character Sums for Cayley Graphs". Communications in Algebra. 43 (12): 5159–5167. doi:10.1080/00927872.2014.967398.