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Graphs on surfaces and curves over number fields
November 23, 2022 19:00–20:00, Moscow, on-line
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Number of connected components in the space of Pell-Abel equations admitting primitive solution of given degree
A. B. Bogatyreva, Quentin Gendronb a Marchuk Institute of Numerical Mathematics of the Russian Academy of Sciences, Moscow
b Math. Inst. UNAM
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Abstract:
Pell-Abel equation is the functional reincarnation of the known diophantine equation P^2-DQ^2=1 where P, Q and D are complex polynomials. Monic D is known and has no multiple roots; P and Q have to be found. Given D, the set of nontrivial solutions (P,Q)\neq (1,0) is generated by the so called primitive solution with minimal deg P >0. We use pictorial calculus of weighted planar graphs to calculate the number of connected components in the space of equations with fixed degrees of D and the primitive solution.
Language: English
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