Complete spectrum of the Robin eigenvalue problem on the ball
Abstract
We investigate the following Robin eigenvalue problem equation* \ arrayll - u=μ u\,\, &in\,\, B,\\ ∂n u+α u=0 &on\,\, ∂ B array . equation* on the unit ball of RN. We obtain the complete spectral structure of this problem. In particular, for α>0, the first eigenvalue is k,12 and the second eigenvalue is k+1,12, where k+l,m is the mth positive zero of kJ+l+1(k)-(α+l) J+l(k). Moreover, when α∈(-l,1-l) with any l∈ N, one has l negative (strictly increasing) eigenvalues -k+i,12 with i∈\0,…,l-1\ where k+l,1 denotes the unique zero of α I+l(k)+lI+l(k)+kI+l+1(k); while, for α=-l, besides l negative (increasing) eigenvalues, 0 is also an eigenvalue.
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