On relationship between canonical momentum and geometric momentum
Abstract
Decompositing of N+1-dimensional gradient operator in terms of Gaussian normal coordinates (0,μ), (μ=1,2,3,...,N) and making the canonical momentum P0 along the normal direction n to be hermitian, we obtain nP0=-i( n∂ 0-M0) with M0 denoting the mean curvature vector on the surface 0=const. The remaining part of the momentum operator lies on the surface, which is identical to the geometric one.
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