Four-spiral semigroup

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Formulation

By definition, if C is a category in which morphisms are isomorphisms, the number of points in C is denoted by

#C=โˆ‘p1#Aut(p),

with the sum running over objects p. (The series may diverge in general.) The formula states: for a smooth algebraic stack X over the finite field ๐…q and the "arithmetic" Frobenius f:Xโ†’X (i.e., the inverse of the Frobenius in Grothendieck's formula),

#X(๐…q)=qdimXโˆ‘iโ‰ฅ0(โˆ’1)itr(f;Hi(X(๐…q),โ„šl)),

The Siegel mass formula computes the left-hand side:[1] if G is a semisimple group with tamagawa number ฯ„(G),

#X(๐…q)=ฯ„(G)โˆx1vol(G(๐’ชx))