On Hadamard Inequality for Log-Concave Functions

Estimates for the average value of a concave function are called Hadamard inequalities. If Lebesgue measure is replaced by a (signed) measure then it is still possible to get interesting and sharp inequalities. Here we extend these inequalities to log-concave functions.

For an n × n positive semi-definite (psd) matrix A, Peter Heyfron showed in [9] that the normalized hook immanants, dk , k = 1, . . . , n, satisfy the dominance ordering

In this note, we give a counterexample to show that Hadamard's inequality does not hold on a polyhedron in multi-dimensional Euclidean space. Then we give a sufficient condition on the polyhedron for Hadamard's inequality to hold. Finally, we provide an approach to create a large class of polyhedra