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The Relations between the Invariants of Two Surfaces in (1, n) Cyclic Correspondence

Published online by Cambridge University Press:  24 October 2008

Ronald Frith
Affiliation:
Trinity College

Extract

On a surface F′ an algebraic self-correspondence T of period n defines a cyclic involution In of sets of n points. Then if there exists a surface F whose points are in (1, 1) correspondence with the sets of In, the surfaces F, F′ will be said to be in (1, n) cyclic correspondence. The purpose of the present paper is to show that, when n is a prime number and with certain restrictions upon the united curve of the self-correspondence T, the irregularities of the surfaces F and F′ are equal.

Type
Research Article
Copyright
Copyright © Cambridge Philosophical Society 1936

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References

* Severi, , “Relazioni che legano i caratteri invarianti di due superficie in corrispondenza algebrica”, Rend. Lombardi (11), 36 (1903), 495511.Google Scholar

Severi, loc. cit. p. 509.

* See Godeaux, , “Recherches sur les involutions doués d'un nombre fini de points de coincidence”, Bull. Soc. Math. de France, 47 (1919), 116.Google Scholar

Baker, , Principles of Geometry, 6, 140, 224.Google Scholar

Picard-Simart, , Fonctions algébriques de deux variables, 2 (1906), 438.Google Scholar

* Baker, loc. cit. p. 269.

The partial systems in both (i) and (ii) are, if necessary, augmented by fixed parts.

* Baker, loc. cit. p. 285.