Asymptotic behavior of eigenvalues of certain integral operators

Milutin Dostani\'c

Abstract: We find exact asymptotic behavior of positive and negative eigenvalues of the operator $\int_\Omega k(x-y)a(y)\cdot dy$, where $k$ is a real radial nonhomogenous function (satisfying some aditional condition) and $a$ is a continuous function changing sign on $\Omega\subset R^m$.

Classification (MSC2000): 47B10

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