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Docta Complutense author Sols Lucía, Ignacio author Arrondo Esteban, Enrique 2023-06-20T18:43:02Z 2023-06-20T18:43:02Z 1992 0249-633X https://hdl.handle.net/20.500.14352/58413 http://smf4.emath.fr/en/Publications/Memoires/1992/50/html/smf_mem-ns_50.html http://smf4.emath.fr/en/http://www.numdam.org/numdam-bin/feuilleter?id=MSMF_1992_2_50_ This well-written paper contains the thesis of Arrondo, written under the supervision of Sols. The topic is the study of smooth congruences (i.e. surfaces in the Grassmannian G=Gr(1,3) ), showing their parallelism with surfaces in P 4 . The authors give a simple proof of the fact that the only indecomposable bundles on G with vanishing intermediate cohomology are the line bundles and the twists of the spinor bundle. This fact is needed in order to introduce and study the good notion of linkage for congruences, called spinorial linkage. Some results in the spirit of the paper of A. P. Rao [Math. Ann. 258 (1981/82), no. 2, 169–173] are proved. Moreover, the Hilbert schemes of all smooth congruences of degree at most nine are described, improving a paper of the authors [J. Reine Angew. Math. 393 (1989), 199–219;] and a paper of A. Verra [Manuscripta Math. 62 (1988), no. 4, 417–435]. The most original result is the classification, in the flavor of Severi's theorem, of the smooth congruences that can be obtained as a projection from another surface in Gr(1,4) . There are five classes, all described. The proof is geometrical and is completely different from the case of P 4 . In the last chapter, done in collaboration with M. Pedreira, the authors prove that there are finitely many components of the Hilbert scheme consisting of smooth congruences not of general type. The analogous result for surfaces in P 4 was proved by G. Ellingsrud and C. Peskine [Invent. Math. 95 (1989), no. 1, 1–11]. Some technical lemmas which extend to curves in Q 3 the Gruson-Peskine bound for curves in P 3 are needed. eng On congruences of lines in the projective space. journal article URL https://docta.ucm.es/bitstreams/9f119264-638f-4b3c-9913-cb500ea1ae26/download File MD5 7b462b7d428c790c3f81dc3f20e0b344 4772687 application/pdf Sols29.pdf URL https://docta.ucm.es/bitstreams/ac50fbe0-7e1c-402b-a375-5b8f4788ff43/download File MD5 f100bb2e968649ee7ab4c19ef462613d 151932 text/plain Sols29.pdf.txt