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I think they are that $\alpha_1, \dots \alpha_d$ are called Latticelattice ray generators and $E$ is the set of lattice points in the fundamental domain. It is a special case of Gordan's lemma: the case when the cone is simplicial.
I think they are that $\alpha_1, \dots \alpha_d$ are called Lattice ray generators and $E$ is the set of lattice points in the fundamental domain. It is a special case of Gordan's lemma: the case when the cone is simplicial.
I think that $\alpha_1, \dots \alpha_d$ are called lattice ray generators and $E$ is the set of lattice points in the fundamental domain. It is a special case of Gordan's lemma: the case when the cone is simplicial.
I think they are that $\alpha_1, \dots \alpha_d$ are called Lattice ray generators and $E$ is the set of lattice points in the fundamental domain. It is a special case of Gordan's lemma: the case when the cone is simplicial.
