On the algebraic independence of generic Painleve transcendents
classification
🧮 math.AG
math.CAmath.LO
keywords
painlevegenericequationprovealgebraicalgebraicallyalreadyclasses
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We prove that if y" = f(y,y',t) is a generic Painleve equation from among the classes II to V then any collection of distinct solutions and their derivatives are algebraically independent over C(t). (Already proved by Nishioka for the single Painleve I equation). For generic Painleve VI we prove a slightly weaker statement.
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