Green function, Painlevé VI equation, and Eisenstein series of weight one

Abstract: We study the problem: How many singular points of a solution λ(t) to the Painlevé VI equation with parameter ( 1 8 , −1 8 , 1 8 , 3Based on Hitchin's formula, we explore the connection of this problem with Green function and the Eisenstein series of weight one. Among other things, we prove:(i) There are only three solutions which have no singular points in C \ {0, 1}. (ii) For a special type of solutions (called real solutions here), any branch of a solution has at most two singular points (in particular, at m… Show more

“…The reason why we choose the fundamental domain F 0 will be clear from the proof, particularly Lemma 2.3. The basic strategy is similar to that of proving Theorem A in [6]. However, the argument is more involved and new techniques are needed.…”

Critical points of the classical Eisenstein series of weight two

“…The reason why we choose the fundamental domain F 0 will be clear from the proof, particularly Lemma 2.3. The basic strategy is similar to that of proving Theorem A in [6]. However, the argument is more involved and new techniques are needed.…”

Critical points of the classical Eisenstein series of weight two

“…Remark 2.3. Recently, Chen, Kuo, Lin and Wang in [36] showed that G(z) might have an extra pair of "non-trivial" critical points other than the three half periods points for a class of flat tori. Moreover, the "non-trivial" critical points are always non-degenerate.…”

Mean field equations on tori: Existence and uniqueness of evenly symmetric blow-up solutions

“…all solutions of (1.11) are free of logarithmic singularity at any singular point. See [4,5,7,18] for recent developments of (1.11). Like (1.2), we could associate a hyperelliptic curve Γ n,p (τ ) := {(A, W )|W 2 = Q n,p (A; τ )} and an addition map σ n,p with (1.11).…”

The geometry of generalized Lamé equation, I