| 释义 |
Sierpinski set Sierpinski set[sər′pin·skē ‚set] (mathematics) A set of points S on a line such that both S and its complement contain at least one point in each uncountable set on the line that is a countable intersection of open sets. A set of points in a plane that includes at least one point of each closed set of nonzero measure and does not include any subsets consisting of three collinear points. |