homotopy of maps

Let $X,Y$ be topological spaces, $A$ a closed subspace of $X$ and $f,g:X\to Y$ continuous maps. A homotopy of maps is a continuous function $F:X\times [0,1]\to Y$ satisfying

1. 1.

   $F(x,0)=f(x)$ for all $x\in X$

2. 2.

   $F(x,1)=g(x)$ for all $x\in X$

3. 3.

   $F(x,t)=f(x)=g(x)$ for all $x\in A,t\in [0,1]$.

We say that $f$ is homotopic to $g$ relative to $A$ and denote this by $f\simeq g$ $relA$. If $A=\mathrm{\varnothing }$, this can be written $f\simeq g$. If $g$ is the constant map (i.e. $g(x)=y$ for all $x\in X$), then we say that $f$ is nullhomotopic.