Noncommutative geometry of rational elliptic curves
Abstract
We study an interplay between operator algebras and geometry of rational elliptic curves. Namely, let OB be the Cuntz-Krieger algebra given by square matrix B=(b-1, ~1, ~b-2, ~1), where b is an integer greater or equal to two. It is proved, that there exists a dense self-adjoint sub-algebra of OB, which is isomorphic (modulo an ideal) to a twisted homogeneous coordinate ring of the rational elliptic curve E( Q)=\(x,y,z) ∈ P2( C) ~|~ y2z=x(x-z)(x-b-2 b+2z)\.
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