Existence Results of Singular Toda Systems with Sign-Changing Weight Functions
Abstract
We consider the existence problem of the following Singular Toda system on a compact Riemann surface (, g) without boundary equation* cases -gu1=21(h1eu1∫h1eu1dVg-1)-2(h2eu2∫h2eu2dVg-1)-4πα1(δ0-1), -gu2=22(h2eu2∫h2eu2dVg-1)-1(h1eu1∫h1eu1dVg-1)-4πα2(δ0-1), cases equation* where h1,\,h2 are sign-changing smooth functions, 1:=4π(1+α1),\,0<2<4π(1+α2),\,αi=\0,αi\,\,αi>-1,\,i=1,2. By relying on the proof framework established in DJLW, the Pohozaev identity and the classical blow-up analysis, we prove the existence theorem under some appropriate condition. Our results generalize Jost-Wang's results JLW from regular Toda system with positive functions to the singular Toda system involving sign-changing weight functions.
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