We study analytic properties of solutions to the q-Painleve VI equation (q-P(VI)), which was derived by Jimbo and Sakai as the compatibility condition for a connection preserving deformation (CPD) of a linear q-difference equation. We investigate local behaviours of solutions to q-P(VI) around a boundary point making use of the structure of the CPD. We also give a formula connecting the local behaviours of a solution around two boundary points. The results in this paper should be useful in future for studying more detailed global properties of solutions to q-P(VI) or exploring new special solutions with remarkable analytic properties.

• 出版日期2010-7