Abstract
This paper deals with the analysis of quadratic pencils under conic constraints. To be more precise, one studies an eigenvalue problem of the form K∋x⊥(λ2A+λB+C)x∈K*, where is a closed convex cone in a Euclidean space, refers to the dual cone of , and indicates orthogonality. The matrices , , and , are real but not necessarily symmetric.
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