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A remark on the degree of commutative algebraic groups. (English) Zbl 0691.14028
Let G be a connected commutative algebraic group over an algebraically closed field k. Then $$G/L=A$$ is an abelian variety, where L is the maximal connected linear subgroup of G. The paper answers a question of D. Bertrand and P. Philippon [Ill. J. Math. 32, 263-280 (1988; Zbl 0618.14020)] about degrees associated with an open L- equivariant immersion of L into a projective L-variety P, an L-linearized line bundle M on P, a line bundle N on A, and the corresponding gadgets for an algebraic subgroup $$G'$$ of G.

##### MSC:
 14L15 Group schemes