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An Extension of Heilbronn's Class-Number Theorem


     

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Let h(d) denote the number of primitive classes of binary quadratic forms of negative discriminant d. Heilbronn has recently proved that

Theorem I.

h(d)→∞

as -d→∞.

By a slight modification of Heilbronn's argument I show that

Theorem II.

h(d)/2t→∞

as -d→∞,

where t is the number of different prime factors of d.


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  • An Extension of Heilbronn's Class-Number Theorem

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Abstract


Let h(d) denote the number of primitive classes of binary quadratic forms of negative discriminant d. Heilbronn has recently proved that

Theorem I.

h(d)→∞

as -d→∞.

By a slight modification of Heilbronn's argument I show that

Theorem II.

h(d)/2t→∞

as -d→∞,

where t is the number of different prime factors of d.