摘要
对非线性奇异积分方程其中L为一封闭光滑曲线;a,b,c为常数,在H(?)lder连续函数空间中求解时将其化为一个带根号的Riemann边值问题而得出其一般解.本文得知;一般说来,它具有非平凡解.其解的表达式以及可解条件均已得出.
The nonlinear singular integral equationwhere a, b, c are constants and L is a smooth closed contour, is solved in Holder continuousspace by transforming it to a Riemann boundary value problem with square roots. It is found that, in general, it has other solutions besides the trivial constant ones. The expression of such solutions as well as the conditions of its solvability is obtained.
出处
《数学年刊(A辑)》
CSCD
北大核心
2002年第5期619-624,共6页
Chinese Annals of Mathematics
基金
国家自然科学基金(No.19871064)资助的项目.
