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Ihara_zeta_function abstract "In mathematics, the Ihara zeta-function is a zeta function associated with a finite graph. It closely resembles the Selberg zeta-function, and is used to relate closed paths to the spectrum of the adjacency matrix. The Ihara zeta-function was first defined by Yasutaka Ihara in the 1960s in the context of discrete subgroups of the two-by-two p-adic special linear group. Jean-Pierre Serre suggested in his book Trees that Ihara's original definition can be reinterpreted graph-theoretically. It was Toshikazu Sunada who put this suggestion into practice (1985). A regular graph is a Ramanujan graph if and only if its Ihara zeta function satisfies an analogue of the Riemann hypothesis.".
Ihara_zeta_function wikiPageID "1342362".
Ihara_zeta_function wikiPageRevisionID "562630330".
Ihara_zeta_function hasPhotoCollection Ihara_zeta_function.
Ihara_zeta_function subject Category:Algebraic_graph_theory.
Ihara_zeta_function subject Category:Zeta_and_L-functions.
Ihara_zeta_function comment "In mathematics, the Ihara zeta-function is a zeta function associated with a finite graph. It closely resembles the Selberg zeta-function, and is used to relate closed paths to the spectrum of the adjacency matrix. The Ihara zeta-function was first defined by Yasutaka Ihara in the 1960s in the context of discrete subgroups of the two-by-two p-adic special linear group. Jean-Pierre Serre suggested in his book Trees that Ihara's original definition can be reinterpreted graph-theoretically.".
Ihara_zeta_function label "Función zeta de Ihara".
Ihara_zeta_function label "Ihara zeta function".
Ihara_zeta_function sameAs Función_zeta_de_Ihara.
Ihara_zeta_function sameAs m.04v66_.
Ihara_zeta_function sameAs Q5994637.
Ihara_zeta_function sameAs Q5994637.
Ihara_zeta_function wasDerivedFrom Ihara_zeta_function?oldid=562630330.
Ihara_zeta_function isPrimaryTopicOf Ihara_zeta_function.