{"slug": "your-functions-doppelganger", "title": "Your function’s doppelgänger", "summary": "The article discusses the importance of notation in convex analysis, highlighting the Fenchel conjugate as a key example of a powerful mathematical primitive introduced by Werner Fenchel in 1949. The author aims to build practical intuition for this concept rather than providing a fully rigorous mathematical treatment.", "body_md": "One of the first things I realized by approaching convex analysis is the importance of notation. The use of simple symbols or tiny marks adjustments to encapsulate different topics, sometimes even a wide class of problems, is crucial for developing extremely powerful mathematical primitives. The Fenchel conjugate, introduced by Werner Fenchel in 1949, perfectly illustrates this idea. Although it may seem mysterious at first glance, it is one of the most important primitives in duality theory. In this post, as in others I may write in the future, I’m not aiming to develop a fully rigorous mathematical treatment of this concept. Instead, I want to offer inputs that spark the kind of mental machinery that helps build a practical intuition, making it easier to categorize and recall in your mind.", "url": "https://wpnews.pro/news/your-functions-doppelganger", "canonical_source": "https://fedemagnani.github.io/math/2025/07/04/fenchel.html", "published_at": "2025-07-04 00:00:00+00:00", "updated_at": "2026-05-23 08:06:46.130896+00:00", "lang": "en", "topics": ["research"], "entities": ["Werner Fenchel"], "alternates": {"html": "https://wpnews.pro/news/your-functions-doppelganger", "markdown": "https://wpnews.pro/news/your-functions-doppelganger.md", "text": "https://wpnews.pro/news/your-functions-doppelganger.txt", "jsonld": "https://wpnews.pro/news/your-functions-doppelganger.jsonld"}}