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arxiv: 1505.03098 · v2 · pith:H3MGOINBnew · submitted 2015-05-12 · 🧮 math.AT · math.CT· math.KT

Spectral Mackey functors and equivariant algebraic K-theory (II)

classification 🧮 math.AT math.CTmath.KT
keywords algebraicfunctorstheoryequivariantmackeyspectralsymmetricauthor
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We study the "higher algebra" of spectral Mackey functors, which the first named author introduced in Part I of this paper. In particular, armed with our new theory of symmetric promonoidal $\infty$-categories and a suitable generalization of the second named author's Day convolution, we endow the $\infty$-category of Mackey functors with a well-behaved symmetric monoidal structure. This makes it possible to speak of spectral Green functors for any operad $O$. We also answer a question of A. Mathew, proving that the algebraic $K$-theory of group actions is lax symmetric monoidal. We also show that the algebraic $K$-theory of derived stacks provides an example. Finally, we give a very short, new proof of the equivariant Barratt-Priddy-Quillen theorem, which states that the algebraic $K$-theory of the category of finite $G$-sets is simply the $G$-equivariant sphere spectrum.

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