Baker functions for compact Riemann surfaces

Schilling, R. J.

doi:10.1090/S0002-9939-1986-0861773-X

Baker functions for compact Riemann surfaces
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by R. J. Schilling PDF

Proc. Amer. Math. Soc. 98 (1986), 671-675 Request permission

Abstract:

This article contains a proof of an important theorem in soliton mathematics. The theorem, stated roughly in [4], contains necessary conditions for the existence of a vector function \[ \psi (t,p) = ({\psi _1}(t,p), \ldots ,{\psi _l}(t,p)),\quad t \in {{\mathbf {C}}^g},\quad p \in R,\] with prescribed poles and $l$ essential singularities an a compact Riemann surface $R$ of genus $g$. $\psi$ is called a Baker function in honor of the 1928 article [1] of H. F. Baker. This report clarifies Krichever’s description of $\psi$ for $l > 1$ essential singularities. The divisors ${\delta _\alpha }$ in (1) below are the key to the $l > 1$ construction. Krichever’s $(l > 1)$ construction is not easy to deal with in practical problems. E. Previato [5] noted this and applied our characterization of the ${\delta _\alpha }$ to construct the finite gap solutions to the nonlinear Schroedinger equation.

References

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Hyperelliptic curves and solitons