I recently came across the concept of a $\kappa$-cones of a metric space (Chapter I.5.2) of Bridson and Haefliger's book. In their Proposition 5.8, the provide some intuition of $\kappa$-cones by showing that $C_{\kappa}M_1^n\cong M_{\kappa}^n$ for any $\kappa\in \mathbb{R}$; where $C_{\kappa}X$ denotes the $\kappa$-cone of a metric space $X$ and $\cong$ denotes isometry.
Are there any good references focusing on $\kappa$-cones in some details, to gain some intuition on the topic? Specifically, I'd like to understand how $\kappa$-cones:
- "functoriality" i.e. is $C_{\kappa_1}C_{\kappa_2}X\cong C_{\kappa_1+\kappa_2}X$? (or in particular, can $C_{\kappa}M_{\kappa}^n$ be identified with something simple such as some $M_{\tilde{\kappa}}$ for some $\tilde{\kappa}\in \mathbb{R}$?)
- How does $C_{\kappa}$ interact with $p$-products of metric spaces?
