In homotopy theory, a branch of algebraic topology, a Postnikov system (or Postnikov tower) is a way of decomposing a topological space by filtering its homotopy type. What this looks like is for a space there is a list of spaces where
and there's a series of maps that are fibrations with fibers Eilenberg-MacLane spaces . In short, we are decomposing the homotopy type of using an inverse system of topological spaces whose homotopy type at degree agrees with the truncated homotopy type of the original space . Postnikov systems were introduced by, and are named after, Mikhail Postnikov.
There is a similar construction called the Whitehead tower (defined below) where instead of having spaces with the homotopy type of for degrees , these spaces have null homotopy groups for .