Twisted Homotopy: A Group Theoretic Approach
Abstract
After summarising the physical approach leading to twisted homotopy and after developing the cohomological approach further with respect to our previous work we propose a third alternative approach to twisted homotopy based on group theoretic considerations. In this approach the fundamental group (m) isomorphic to Z which describes homotopic loops on the punctured plane R2/(0) is enhanced in a special way to the continuous SO(2) group . This is performed by letting the parameter of the group m → λ while keeping its generator unchanged .It is shown that such non-trivial procedure has the effect of introducing well defined self-interactions among loops which are at the basis of twisted homotopy where the angle λ plays the role of the self coupling constant. KEYWORDS: Homotopy, Group Theory, Quantum Mechanics MSC:55Q35; PACS:02.20.Fh ; 03.65.Fd
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