I would say: functional analysis, Lie theory and a bit abstract algebra of graded Lie algebras.wyattbohr said:I just recently graduated with a mathematics degree. Lately, I've been very fascinated with quantum mechains and string theory, but when I try to do research I am a little overwhelmed by all the varying topics of advanced mathematics I have to know. Can anyone suggest mathematical topics to teach myself to better understand string theory and quantum mechanics? Thank you :)
String Theory/SuperString is a theoretical framework in physics that attempts to reconcile general relativity and quantum mechanics by describing the fundamental building blocks of the universe as tiny, vibrating strings.
Mathematics is crucial in understanding String Theory/SuperString as it provides the necessary tools and language to describe the complex interactions and behavior of these tiny strings. It involves advanced mathematical concepts such as differential geometry, topology, and algebraic geometry.
Some of the main mathematical concepts used in String Theory/SuperString include differential equations, group theory, and complex analysis. These concepts help to describe the properties and behavior of strings and their interactions.
String Theory/SuperString has connections to various areas of mathematics such as topology, algebraic geometry, and number theory. It also incorporates concepts from other areas of physics, such as quantum mechanics and general relativity.
One of the main challenges in using mathematics to understand String Theory/SuperString is that it involves highly complex and abstract mathematical concepts, making it difficult for non-mathematicians to grasp. Additionally, there is still much research and development needed to fully understand and prove the validity of String Theory/SuperString.