Phantom map

In homotopy theory, phantom maps are continuous maps ${\textstyle f:X\to Y}$ of CW-complexes for which the restriction of ${\textstyle f}$ to any finite subcomplex ${\textstyle Z\subset X}$ is inessential (i.e., nullhomotopic). J. Frank Adams and Grant Walker (1964) produced the first known nontrivial example of such a map with ${\textstyle Y}$ finite-dimensional (answering a question of Paul Olum). Shortly thereafter, the terminology of "phantom map" was coined by Brayton Gray (1966), who constructed a stably essential phantom map from infinite-dimensional complex projective space to ${\textstyle S^{3}}$ .^[1] The subject was analysed in the thesis of Gray, much of which was elaborated and later published in (Gray & McGibbon 1993). Similar constructions are defined for maps of spectra.^[2]

Definition

Let $\alpha$ be a regular cardinal. A morphism $f:x\longrightarrow y$ in the homotopy category of spectra is called an $\alpha$ -phantom map if, for any spectrum s with fewer than $\alpha$ cells, any composite $s\longrightarrow x\xrightarrow {f} y$ vanishes.^[3]

References

^ Mathew, Akhil (2012-06-13). "An example of a phantom map". Climbing Mount Bourbaki. Archived from the original on 2021-07-31.
^ Lurie, Jacob (2010-04-27). "Phantom Maps (Lecture 17)" (PDF). Archived (PDF) from the original on 2022-01-30.
^ Neeman, Amnon (2010). Triangulated Categories. Princeton University Press.

Adams, J. Frank; Walker, G. (1964), "An example in homotopy theory", Proc. Cambridge Philos. Soc., 60 (3): 699–700, Bibcode:1964PCPS...60..699A, doi:10.1017/S0305004100077422, MR 0166786
Gray, Brayton I. (1966), "SPACES OF THE SAME n-TYPE, FOR ALL n", Topology, 5 (3): 241–243, doi:10.1016/0040-9383(66)90008-5, MR 0196743
Gray, Brayton; McGibbon, C.A. (1993), "Universal phantom maps", Topology, 32 (2): 371–294, doi:10.1016/0040-9383(93)90027-S

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[1] Mathew, Akhil (2012-06-13). "An example of a phantom map". Climbing Mount Bourbaki. Archived from the original on 2021-07-31.

[2] Lurie, Jacob (2010-04-27). "Phantom Maps (Lecture 17)" (PDF). Archived (PDF) from the original on 2022-01-30.

[3] Neeman, Amnon (2010). Triangulated Categories. Princeton University Press.

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