Algebroid Solutions of the Degenerate Third Painlev\'e Equation for Vanishing Formal Monodromy Parameter

Abstract

Various properties of algebroid solutions of the degenerate third Painlev\'e equation, equation* u (τ) \! = \! (u(τ))2u(τ) \! - \! u(τ)τ \! + \! 1τ \! (-8 (u(τ))2 \! + \! 2ab ) \! + \! b2u(τ), =1, b>0, equation* for the monodromy parameter a=0 are studied. The paper contains connection results for asymptotics as τ+0 and as τ+∞ for a∈C. Using these results, the simplest algebroid solution with asymptotics u(τ) cτ1/3 as τ0, where c∈C\0\, together with its associated integral ∫0τ (u(t))-1\,d t, are considered in detail, and their basic asymptotic behaviours are visualized.