한국수학교육학회지시리즈B:순수및응용수학 (The Pure and Applied Mathematics)
- 제9권2호
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- Pages.113-118
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- 2002
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- 1226-0657(pISSN)
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- 2287-6081(eISSN)
INTERSECTION OF THE DEGREE-n BIFURCATION SET WITH THE REAL LINE
- Geum, Young-Hee (Department of Applied mathematcis, Dankook University) ;
- Kim, Young-Ik (Department of Applied mathematcis, Dankook University)
- 발행 : 2002.11.01
초록
Definition and some properties of the degree-n bifurcation set are introduced. It is proved that the interval formed by the intersection of the degree-n bifurcation set with the real line is explicitly written as a function of n. The functionality of the interval is computationally and geometrically confirmed through numerical examples. Our study extends the result of Carleson & Gamelin [2].