@article{oai:tsukuba.repo.nii.ac.jp:00038217,
 author = {加藤, 久男 and Kato, Hisao and Matsuhashi, Eiichi},
 journal = {Topology and its applications},
 month = {Apr},
 note = {We prove that for each n≥1n≥1 the set of all surjective continuum-wise injective maps from an n  -dimensional continuum onto an LCn−1LCn−1-continuum with the disjoint (n−1,nn−1,n)-cells property is a dense GδGδ-subset of the space of all surjective maps. As a corollary, we get the following result which is essentially proved in [5]; the set of all arcwise increasing maps from the closed unit interval onto a Peano continuum without free arcs is a dense GδGδ-subset of the space of all surjective maps.},
 pages = {410--417},
 title = {Continuum-wise injective maps},
 volume = {202},
 year = {2016}
}