Key points are not available for this paper at this time.
In this and the subsequent paper, we are interested in thefollowing nonlinear equation: g v+ (h^* eᵛM h^* vd (x) -1) =4₉=₁Nⱼ (ₐ㶁-1) M, (0. 1) where (M, g) is a Riemann surface with its area |M|=1; or v+^*eᵛ_ h^*eᵛdx=4₉=₁Nⱼ ₐ䲛, (0. 2) where is a bounded smooth domain in R². Here, , ⱼ are positive constants, q is the Diracmeasure at q, and both h^*'s are positive smooth functions. Inthis paper, we prove a sharp estimate for a sequence of blowing upsolutions uₖ to (0. 1) or (0. 2) withₖ*. Among other things, we show that forequation (0. 1), ₖ-_*=₉=₁^ dⱼ (^* (pⱼ) +_*-N^*-2K (pⱼ) +o (1) ) e^-ₖ{1+ⱼ}, (0. 3) and for equation (0. 2), ₖ-_*=₉=₁^ dⱼ (^* (pⱼ) +o (1) ) e^-ₖ{1+ⱼ}, (0. 4) where ₖ+ and dⱼ is a constantdepending on pⱼ, a blow up point of uₖ. See section 1 formore precise description. These estimates play an important rolewhen the degree counting formulas are derived. The subsequentpaper 19 will complete the proof of computing thedegree counting formula.
Chen et al. (Fri,) studied this question.