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Regular Surfaces of Genus Two: Part I

Published online by Cambridge University Press:  20 November 2018

Patrick Du Val
Patrick Du Val*
Affiliation:
University of Bristol
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The present paper is a sequel to one I published lately (3) on regular surfaces of genus 3, and like it, is intended to fill up some of the gaps in our detailed knowledge of the regular surfaces of moderately low genus p = pg = pa and linear genus p(1) = n + 1 > 1. (The surfaces for which p(1) = 1 form a rather separate field of study on which a good deal of work has been done, and I shall not consider them.)

Type
Research Article
Information
Canadian Journal of Mathematics , Volume 5 , 1953 , pp. 216 - 237
Copyright
Copyright © Canadian Mathematical Society 1953

References

1. Castelnuovo, G., Suite superficie algebriche le cui sezioni plane sono curve iperelliUiche, Rend. Circ. Mat. Palermo, 4 (1890), 7388.Google Scholar
2. Du Val, P., On absolute and non-absolute singularities of algebraic surfaces, Rev. Fac. Sci. Istanbul (A), 9 (1944), 159215.Google Scholar
3. Du Val, P., On regular surfaces of genus 3, Can. J. Math., 3 (1951), 148154.Google Scholar
4. Du Val, P., On regular surfaces whose canonical system is hyper elliptic, Can. J. Math., 4 (1952), 204221.Google Scholar
5. Du Val, P., On loci whose curve sections are hyper elliptic, J. London Math. Soc, 28 (1953), 18.Google Scholar
6. Enriques, F., Sui sistemi lineari di superficie algebriche ad intersezioni variabili iperelliUiche, Math. Ann., v (1895), 179199.Google Scholar
7. Enriques, F., Le superficie algebriche (Bologna, 1949).Google Scholar