Hadamard-type inequalities for k-positive matrices
Abstract
We establish Hadamard-type inequalities for a class of symmetric matrices called k-positive matrices for which the m-th elementary symmetric functions of their eigenvalues are positive for all m≤ k. These matrices arise naturally in the study of k-Hessian equations in Partial Differential Equations. For each k-positive matrix, we show that the sum of its principal minors of size k is not larger than the k-th elementary symmetric function of their diagonal entries. The case k=n corresponds to the classical Hadamard inequality for positive definite matrices. Some consequences are also obtained.
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