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On Translation Planes which Admit Solvable Autotopism Groups Having a Large Slope Orbit

Published online by Cambridge University Press:  20 November 2018

Vikram Jha
Vikram Jha*
Affiliation:
University of Iowa, Iowa City, Iowa
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Our main object is to prove the following result.

THEOREM C. Let A be an affine translation plane of order qrq2 suchthatl∞, the line at infinity, coincides with the translation axis of A. Suppose G is a solvable autotopism group of A that leaves invariant a set Δ of q + 1 slopes and acts transitively on l \ Δ.

Then the order of A is q2.

An autotopism group of any affine plane A is a collineation group G that fixes at least two of the affine lines of A; if in fact the fixed elements of G form a subplane of A we call G a planar group. When A in the theorem is a Hall plane [4, p. 187], or a generalized Hall plane ([13]), G can be chosen to be a planar group.

Type
Research Article
Information
Canadian Journal of Mathematics , Volume 36 , Issue 5 , 01 October 1984 , pp. 769 - 782
Copyright
Copyright © Canadian Mathematical Society 1984

References

1. Cohen, S. D. and Ganley, M. J., A class of translation planes, to appear in Quart. J. MathGoogle Scholar
2. Foulser, D. A., Subplanes of partial spreads in translation planes, Bull. London Math. Soc. 4 (1972), 3238.Google Scholar
3. Foulser, D. A., Planar collineations of order p in translation planes of order pr , Geom. Dedicata 5 (1976), 393409.Google Scholar
4. Hughes, D. R. and Piper, F. C., Projective planes (Springer-Verlag, Berlin, 1973).Google Scholar
5. Jha, V., On tangentially transitive translation planes and related systems, Geom Dedicata 4 (1975), 457483.Google Scholar
6. Jha, V., On Δ-transitive translation planes. Arch. Math. 37 (1981). 377384.Google Scholar
7. Jha, V., On subgroups and factor groups of GL(n, q) acting on spreads with the same characteristic, Discrete Math. 41 (1982), 4351.Google Scholar
8. Jha, V., On spreads admitting large autotopism groups, Proc. Conf. on Finite Geometries, Pullman, 1981 (Marcel and Dekker, New York, 1983).Google Scholar
9. Jha, V., >On semitransitive translation planes, to appear in Geom. Dedicata.On+semitransitive+translation+planes,+to+appear+in+Geom.+Dedicata.>Google Scholar
10. Johnson, N. L. and Ostrom, T. G., The translation planes of order 16 that admit PSL(2, 7), J. Comb. Theory, A 26 (1979), 127134.Google Scholar
11. Kantor, W. M., Expanded, sliced and spread spreads, Proc. Conf. on Finite Geometries, Pullman, 1981 (Marcel and Dekker, New York, 1983).Google Scholar
12. Kantor, W. M., Translation planes of order q6 admitting SL(2, q2), J. Comb. Theory, A 32 (1982), 299302.Google Scholar
13. Kirkpatrick, P. B., Generalizations of Hall planes of odd order, Bull. Austral. Math. Soc. 4 (1971), 205209.Google Scholar
14. Lorimer, P., A projective plane of order 16, J. Comb. Theory, A 16 (1974), 334347.Google Scholar
15. Lüneburg, H., Translation planes (Springer-Verlag, Berlin, 1980).CrossRefGoogle Scholar
16. Ostrom, T. G., Finite translation planes, Lecture Notes in Mathematics 158 (Springer-Verlag, Berlin, 1970).CrossRefGoogle Scholar
17. Passman, D. S., Permutation groups (Benjamin, New York, 1968).Google Scholar
18. Riefart, A. and Dempwolff, U., Classification of translation planes of order 16 (I), (to appear).CrossRefGoogle Scholar
19. Walker, M., A class of translation planes, Geom. Dedicata 5 (1976), 135146.Google Scholar
20. Zsigmondy, K., Zur Théorie der Potenzreste, Monatsh. Math. Phys. 3 (1892), 265284.Google Scholar