Group theoretic quantization of punctured plane
Abstract
We quantize punctured plane, X=R2-\0\, employing Isham's group theoretic quantization procedure. After sketching out a brief review of group theoretic quantization procedure, we apply the quantization scheme to the phase space, M=X × 2, corresponding to the punctured plane, X. Particularly, we find the canonical Lie group, G, corresponding to the phase space, M=X × 2, to be G = 2 (SO(2)× +). We establish an algebra homomorphism between the Lie algebra corresponding to the canonical group, G = 2 (SO(2)× +), and the smooth functions, f∈ C∞(M), in the phase space, M=X × 2. Making use of this homomorphism and unitary representation of the canonical group, G = 2 (SO(2)× +), we deduce a quantization map that maps a subspace of classical observables, f∈ C∞(M), to self-adjoint operators on the Hilbert space, H, which is the space of all square integrable functions on X=R2-\0\ with respect to the measure μ = φ/(2π).
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