![Convex Optimization via Domain-Driven Barriers and Primal-Dual Interior-Point Methods | Semantic Scholar Convex Optimization via Domain-Driven Barriers and Primal-Dual Interior-Point Methods | Semantic Scholar](https://d3i71xaburhd42.cloudfront.net/3b35241bf957b66c8b495c55ae8dd626cd852835/61-Table5.4-1.png)
Convex Optimization via Domain-Driven Barriers and Primal-Dual Interior-Point Methods | Semantic Scholar
![Fig. A0.2. An example of duality gap arising from non-convexity (see text). | Download Scientific Diagram Fig. A0.2. An example of duality gap arising from non-convexity (see text). | Download Scientific Diagram](https://www.researchgate.net/profile/Amnon_Shashua/publication/24356803/figure/fig1/AS:669423987879938@1536614524265/Projection-of-a-non-neagtaive-vector-f-onto-the-hyperplane-i-x-i-1-0-Under_Q320.jpg)
Fig. A0.2. An example of duality gap arising from non-convexity (see text). | Download Scientific Diagram
![Fig. A0.2. An example of duality gap arising from non-convexity (see text). | Download Scientific Diagram Fig. A0.2. An example of duality gap arising from non-convexity (see text). | Download Scientific Diagram](https://www.researchgate.net/profile/Amnon_Shashua/publication/24356803/figure/fig2/AS:669423987879939@1536614524279/Separating-hyperplane-w-b-with-maximal-margin-The-boundary-points-are-associated-with_Q320.jpg)
Fig. A0.2. An example of duality gap arising from non-convexity (see text). | Download Scientific Diagram
Theorem (4.3.2, FJ necessary). gi, i ∈ I continuous at x , f,g i, i ∈ I differentiable at x , hj continuously differentiable
![Fig. A0.2. An example of duality gap arising from non-convexity (see text). | Download Scientific Diagram Fig. A0.2. An example of duality gap arising from non-convexity (see text). | Download Scientific Diagram](https://www.researchgate.net/profile/Amnon_Shashua/publication/24356803/figure/fig4/AS:669423987879940@1536614524306/Fig-A02-An-example-of-duality-gap-arising-from-non-convexity-see-text_Q640.jpg)