Let X be a topological space, and let A\subseteq X. A defines the following equivalence relation \overset{A}\sim on X: for x,y\in X, x\overset{A}\sim y iff either x=y, or \{x,y\}\subseteq A ...

The cone over a space X is defined as CX = X\times I ~/~ X \times \{1\}. The reduced cone over a pointed space (X, x_0) is defined as \overline{CX} = X\times I ~/~ (X \times \{1\} \cup \{x_0\}\times I) ...

Let p denote the apex of the cone \text{Cone}(S^{n-1}). For each x\in S^{n-1} and each t\in[0,1] let c(x,t)\in \text{Cone}(S^{n-1}) satisfying c(x,t)=(1-t)p+tx Then let f: \text{Cone}(S^{n-1})\to D^n ...

Any partition of \mathbb{N} into ordered triples gives a function f that acts on each triple by cycling (x, y, z) \mapsto (y, z, x) (and conversely, every function f can be described fully by ...

The quotient map q:X\times [0,1]\to CX which sends X\times\{0\} to a single point restricts to a quotient map q':X×(0,1]\to CX-\{P\} since X×(0,1] is open and saturated in X×[0,1]. Since q' ...

To give a map \mathbb{P}^1 \to \mathbb{P}^1 of degree n is equivalent to giving a pair of two homogeneous polynomials of degree n in two variables up to constant without common linear ...