摘要
引入了一类非线性型(带约束)投入产出方程,并用Brouwer度理论和集值分析的方法加以处理,由此获得相应的可解性(即存在性与连续性)结果.
A kind of nonlinear type(with restriction)input-output equation was introduced and tackled by the Brouwer degree theory and set-valued analysis methods,from which the solvability(namely, existentiality and continuity)results were obtained.
出处
《南京大学学报(数学半年刊)》
CAS
2008年第1期76-85,共10页
Journal of Nanjing University(Mathematical Biquarterly)
关键词
投入产出
存在性
连续性
BROUWER度
上半连续
上h半连续
剩余
input-output
existentiality
continuity
Brouwer degree
upper-semi continuous
upper hemi-continuous
residual
