Abstract
Motivated by the problem of finding an explicit description of a developable narrow Möbius strip of minimal bending energy, which was first formulated by M. Sadowsky in 1930, we will develop the theory of elastic strips. Recently E.L. Starostin and G.H.M. van der Heijden found a numerical description for an elastic Möbius strip, but did not give an integrable solution. We derive two conservation laws, which describe the equilibrium equations of elastic strips. In applying these laws we find two new classes of integrable elastic strips which correspond to spherical elastic curves. We establish a connection between Hopf tori and force-free strips, which are defined by one of the integrable strips, we have found. We introduce the P-functional and relate it to elastic strips.
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The first author partially supported by SFB/Transregio 71.