# Sh:449

- Kojman, M., & Shelah, S. (1993).
*\mu-complete Souslin trees on \mu^+*. Arch. Math. Logic,**32**(3), 195–201. arXiv: math/9306215 DOI: 10.1007/BF01375551 MR: 1201649 -
Abstract:

We prove that \mu=\mu^{<\mu}, 2^\mu=\mu^+ and “there is a non reflecting stationary subset of \mu^+ composed of ordinals of cofinality < \mu” imply that there is a \mu-complete Souslin tree on \mu^+. - published version (7p)

Bib entry

@article{Sh:449, author = {Kojman, Menachem and Shelah, Saharon}, title = {{$\mu$-complete Souslin trees on $\mu^+$}}, journal = {Arch. Math. Logic}, fjournal = {Archive for Mathematical Logic}, volume = {32}, number = {3}, year = {1993}, pages = {195--201}, issn = {0933-5846}, doi = {10.1007/BF01375551}, mrclass = {03E05 (03E50)}, mrnumber = {1201649}, mrreviewer = {James Baumgartner}, doi = {10.1007/BF01375551}, note = {\href{https://arxiv.org/abs/math/9306215}{arXiv: math/9306215}}, arxiv_number = {math/9306215} }