| The study of the theory of mappings has important applications in geometric func-tion theory in high dimensioinal spaces. This paper deals with some properties for minors of the differential matrix of space mapping f= (f1,f2,…,fn). By using the definition of Orlicz function, Fatou's Lemma and Lebesgue dominated convergence theorem, we conclude that the coordinate functions of f vanish on the compact subdomain, the value of the minors of differential matrix is 0 when the Orlicz function satisfying the divergence and convexity conditions. |
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