In this talk, we pay much more attention on Kosniowski conjecture, saying that for a nonbounding unitary $S^1$-manifold fixing only isolated points, the number of fixed points is greater than $dim M/4$; in other words, $4chi (M)>dim M$, where $chi(M)$ denotes the Euler characteristic of $M$.I will talk about a proof of this conjecture. Our approach can automatically be applied to the case of oriented $S^1$-manifolds, so we also can conclude that for a nonbounding oriented $S^1$-manifold fixing only isolated points, $2chi (M)>dim M$.