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We prove that there exists $\\lambda_1=\\lambda_1(q,\\Omega)>0$ such that for any $\\lambda\\in(0,\\lambda_1)$ and $a,\\ b>0$, the above Kirchhoff problem possesses at least two positive solutions and one of them is a positive ground state solution. 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We prove that there exists $\\lambda_1=\\lambda_1(q,\\Omega)>0$ such that for any $\\lambda\\in(0,\\lambda_1)$ and $a,\\ b>0$, the above Kirchhoff problem possesses at least two positive solutions and one of them is a positive ground state solution. 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