In this paper we study self-adjoint commuting ordinary differential operators. We find sufficient conditions when an operator of fourth order commuting with an operator of order $4g+2$ is self-adjoint. We introduce an equation on coefficients of the self-adjoint operator of order four and some additional data. With the help of this equation we find the first example of commuting differential operators of rank two corresponding to a spectral curve of arbitrary genus. These operators have polynomial coefficients and define commutative subalgebras of the first Weyl algebra.
The Weyl Algebra, Spherical Harmonics, and Hahn Polynomials
Periodic and rapid decay rank two self-adjoint commuting differential operators
Heat Semigroups on Weyl Algebra
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