kw.\*:("Spectrum (of a graph)")
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The lollipop graph is determined by its Q-spectrumYUANPING ZHANG; XIAOGANG LIU; BINGYAN ZHANG et al.Discrete mathematics. 2009, Vol 309, Num 10, pp 3364-3369, issn 0012-365X, 6 p.Article
Graph Zn and some graphs related to Zn are determined by their spectrumXIAOLING SHEN; YAOPING HOU; YUANPING ZHANG et al.Linear algebra and its applications. 2005, Vol 404, pp 58-68, issn 0024-3795, 11 p.Article
Spectral characterizations of lollipop graphsHAEMERS, Willem H; XIAOGANG LIU; YUANPING ZHANG et al.Linear algebra and its applications. 2008, Vol 428, Num 11-12, pp 2415-2423, issn 0024-3795, 9 p.Article
Spectral characterization of the Hamming graphsBANG, Sejeong; VAN DAM, Edwin R; KOOLEN, Jack H et al.Linear algebra and its applications. 2008, Vol 429, Num 11-12, pp 2678-2686, issn 0024-3795, 9 p.Conference Paper
Connected graphs as subgraphs of Cayley graphs: Conditions on Hamiltonicity : Hamiltonicity problem for vertex-transitive (Cayley) graphsYONG QIN; WENJUN XIAO; MIKLAVIC, Stetko et al.Discrete mathematics. 2009, Vol 309, Num 17, pp 5426-5431, issn 0012-365X, 6 p.Article
The integral 3-harmonic graphsPETROVIC, Miroslav; BOROVICANIN, Bojana; RADOSAVLJEVIC, Zoran et al.Linear algebra and its applications. 2006, Vol 416, Num 2-3, pp 298-312, issn 0024-3795, 15 p.Article
Periodic binary harmonic functions on latticesZAIDENBERG, Mikhail.Advances in applied mathematics (Print). 2008, Vol 40, Num 2, pp 225-265, issn 0196-8858, 41 p.Article