stable homotopy theory
loop space object
suspension object
stable (∞,1)-category
stabilization
triangulated category
stable (∞,1)-category of spectra
spectrum
stable homotopy category
smash product of spectra
symmetric monoidal smash product of spectra
A-∞ ring
E-∞ ring
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In an (∞,1)-category C, for any object X its suspension object ΣX is the homotopy pushout
\array{ X &\to& {*} \\ \downarrow && \downarrow \\ {*} &\to& \Sigma X } \,,
where * is the terminal object.
This is the mapping cone of the terminal map X→*. See there for more details.
This concept is dual to that of loop space object.