Catene di cerchi ottenibili mediante punti pseudoregolari rispetto ad una conica di un piano di Galois
Abstract
Let Q be an elliptic quadric of
odd: the study of certain sets of
circles on Q, so-called chains, is important for the theory of translation planes (cfr.[1]). Here one studies the chains with the property that the planes of
or
circles of the chains all meet in one point and one gaves various examples.
![PG(3,q), q](http://siba-ese.unile.it/plugins/generic/latexRender/cache/e205f861356e20cf576832025b2a4222.png)
![(q+3)/2](http://siba-ese.unile.it/plugins/generic/latexRender/cache/235740d2b071d32fcdf948ebe43e235d.png)
![(q+1)/2](http://siba-ese.unile.it/plugins/generic/latexRender/cache/9136fad69228a524b2f5988cef3cb362.png)
![(q-1)/2](http://siba-ese.unile.it/plugins/generic/latexRender/cache/64351396395a98900d3ae399ac635608.png)
DOI Code:
10.1285/i15900932v1n1p113
Full Text: PDF