selfconcordant

Selfconcordant is a term used in optimization theory to describe a specific property of objective functions. A function is said to be selfconcordant if its third derivative is bounded by a function of its second derivative. More formally, for a univariate function $f(x)$, it is selfconcordant if there exists a constant $M \ge 0$ such that for all $x$ in its domain, $|f'''(x)| \le M |f''(x)|$. This definition is often extended to include a parameter, such that $|f'''(x)| \le M|f''(x)|^{3/2}$ or other variations.

This property is particularly important in the context of interior-point methods, a class of algorithms used

The concept was introduced and developed by Yurii Nesterov and Arkadi Nemirovski in their work on interior-point