<> "The repository administrator has not yet configured an RDF license."^^ . <> . . . "On the spectrum of the weighted\r\np-Laplacian under the Ricci-harmonic flow"^^ . "This paper studies the behaviour of the spectrum of the weighted p-Laplacian on a\r\ncomplete Riemannian manifold evolving by the Ricci-harmonic flow. Precisely, the\r\nfirst eigenvalue diverges in a finite time along this flow. It is further shown that the\r\nsame divergence result holds on gradient shrinking and steady almost Ricci-harmonic\r\nsolitons under the condition that the soliton function is nonnegative and\r\nsuperharmonic. We also continue the program in (Abolarinwa, Adebimpe and Bakare\r\nin J. Ineq. Appl. 2019:10, 2019) to the case of volume-preserving Ricci-harmonic flow."^^ . "2020" . . . "Springer"^^ . . . "Journal of Inequalities and Application"^^ . . . . . . . . . . . . . . "S.O."^^ . "Edeki"^^ . "S.O. Edeki"^^ . . "J. O"^^ . "Ehigie"^^ . "J. O Ehigie"^^ . . "A."^^ . "Abolarinwa"^^ . "A. Abolarinwa"^^ . . . . . . "On the spectrum of the weighted\r\np-Laplacian under the Ricci-harmonic flow (PDF)"^^ . . . "Pages from Abolarinwa2020_Article_OnTheSPectrumOfTheWeightedP-La.pdf"^^ . . "HTML Summary of #15894 \n\nOn the spectrum of the weighted \np-Laplacian under the Ricci-harmonic flow\n\n" . "text/html" . . . "QA Mathematics"@en . . . . . . . . . . . . "S.O."^^ . "Edeki"^^ . "S.O. Edeki"^^ . ""^^ . . "J. O"^^ . "Ehigie"^^ . "J. O Ehigie"^^ . ""^^ . . "A."^^ . "Abolarinwa"^^ . "A. Abolarinwa"^^ . ""^^ .