@article{oai:ksu.repo.nii.ac.jp:00001634,
 author = {石田, 久 and ISHIDA, Hisashi and 亀井, 翼 and KAMEI, Tsubasa and 高橋, 佳伸 and TAKAHASHI, Yoshinobu},
 journal = {京都産業大学論集. 自然科学系列},
 month = {Mar},
 note = {Yeshun Sun & Yongcheng Yin [3] and H. Ishida & T. Itoh [2] presented a precise description of the real cross section of the connectedness locus of the family of bi-quadratic polynomials {(z^2+a)^2+b}. In this note, we shall give a precise description of the real cross section of the connectedness locus of the family of polynomials {(P_2_n_+_1,b ◦ P_2_n_+_1,a)(z)} = {(z^2^n^+^1 +a)^2^n^+^1 +b}, where a, b are complex numbers and n is a positive integer. Our proof is an elementary one.},
 pages = {1--7},
 title = {多項式族 (z^2^n^+^1 + a)^2^n^+^1 + bの連結性集合の実断面},
 volume = {43},
 year = {2014}
}