The Hormander index of symmetric periodic orbits
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🧮 math.SG
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periodichormanderindexorbitsymmetricchebyshevdifferenceformula
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A symmetric periodic orbit is a special kind of periodic orbit that can also be regarded as a Lagrangian intersection point. Therefore it has two Maslov indices whose difference is the Hormander index. In this paper we provide a formula for the Hormander index of a symmetric periodic orbit and its iterates in terms of Chebyshev polynomials.
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