This work develops a unified structural explanation of Heisenberg’s uncertainty principle based onthe infinite-dimensional nature of physical reality and its mathematical representation. Quantumstates are intrinsically wave-like and must be described by functions rather than finite-dimensionalvectors, forcing the use of an infinite-dimensional Hilbert space. Within this framework, fourindependent but mutually reinforcing structures emerge: analytic non-commutativity ofmultiplication and differentiation, Fourier duality and the mutual broadening of a function and itstransform, the symplectic geometry of phase space and its minimal area constraint, and thealgebraic rigidity encoded in the Weyl relations and the Stone–von Neumann theorem. Theselayers form a logical chain from finite-dimensional impossibility to infinite-dimensional necessity,revealing the uncertainty principle as a structural feature of the physical world. The paper furtherdiscusses extensions to the generalized uncertainty principle and the infinite-dimensionalstructure of quantum field theory.
ming Cheng (Mon,) studied this question.
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