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A note on $σ$-model with the target $S^n$

Naively the Hilbert space of a sigma model has to be defined as an L^2 space of functions on the space of free loops of the target. This object is not well defined. In this note we study a finite-dimensional approximations L_N(S^n) of the free loops of the sphere S^n. Spaces L_N(S^n) are defined in terms of finite Fourier series. L_N(S^n) finite-dimensional but singular. We compute Riemann and Ricci curvatures of the smooth locus of this space and study Schrödinger operator in the case of L_1(S^n)

preprint2020arXivOpen access

M. V. Movshev

math-ph math.MP

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A note on $σ$-model with the target $S^n$

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