On the Moduli of a quantized loop in P and KdV flows: Study of hyperelliptic curves as an extension of Euler's perspective of elastica I
Abstract
Quantization needs evaluation of all of states of a quantized object rather than its stationary states with respect to its energy. In this paper, we have investigated moduli of a quantized elastica, a quantized loop with an energy functional associated with the Schwarz derivative, on a Riemann sphere . Then it is proved that its moduli space is decomposed to a set of equivalent classes determined by flows obeying the Korteweg-de Vries (KdV) hierarchy which conserve the energy. Since the flow obeying the KdV hierarchy has a natural topology, it induces topology in the moduli space . Using the topology, is classified. Studies on a loop space in the category of topological spaces are well-established and its cohomological properties are well-known. As the moduli space of a quantized elastica can be regarded as a loop space in the category of differential geometry , we also proved an existence of a functor between a triangle category related to a loop space in Top and that in using the induced topology. As Euler investigated the elliptic integrals and its moduli by observing a shape of classical elastica on , this paper devotes relations between hyperelliptic curves and a quantized elastica on as an extension of Euler's perspective of elastica.
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