Presents a theorem that local sub-SDPs on maximal cliques are exact implies the global clique-wise SDP relaxation is exact for sparse QCQPs, with three classes of local QCQPs under a clique intersection assumption.
Separable QCQPs and Their Exact SDP Relaxations
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abstract
This paper studies exact semidefinite programming relaxations (SDPRs) for separable quadratically constrained quadratic programs (QCQPs). We consider the construction of a larger separable QCQP from multiple QCQPs with exact SDPRs. We show that exactness is preserved when such QCQPs are combined through a separable horizontal connection, where the coupling is induced through the right-hand-side parameters of the constraints. The proposed framework provides a simple sufficient condition for exactness of the resulting SDPR. We then identify notable classes of QCQPs for which this condition holds, including convex QCQPs, QCQPs defined by sign-pattern and graph-structural conditions, and separable homogeneous QCQPs with a limited number of constraints. Two examples illustrate the constructive nature of the proposed framework, showing how heterogeneous QCQPs can be combined to yield new instances with exact SDP relaxations.
fields
math.OC 1years
2026 1verdicts
UNVERDICTED 1representative citing papers
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Local-to-Global Exactness of SDP Relaxations for Sparse QCQPs
Presents a theorem that local sub-SDPs on maximal cliques are exact implies the global clique-wise SDP relaxation is exact for sparse QCQPs, with three classes of local QCQPs under a clique intersection assumption.