K-theory gives a nice way to define vector bundles that don't actually exist. For example, given a singular variety $Y$ embedded into a smooth variety $X$ we can define the virtual normal bundle as $$ [N_{Y/X} ]:= [T_Y|_X] - [T_X] $$ This is useful for studying characteristic classes of singular spaces. What are other examples of virtual bundles and their applications?
What are some applications of virtual vector bundles?
MoarCake559
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