On Second-Order Cone Functions
Abstract
We consider the second-order cone function (SOCF) f: Rn R defined by f(x)= cT x + d -\|A x + b \|. Every SOCF is concave. We give necessary and sufficient conditions for strict concavity of f. The parameters A ∈ Rm × n and b ∈ Rm are not uniquely determined. We show that every SOCF can be written in the form f(x) = cT x + d -δ2 + (x-x*)TM(x-x*). We give necessary and sufficient conditions for the parameters c, d, δ, M = AT A, and x* to be uniquely determined. We also give necessary and sufficient conditions for f to be bounded above.
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