WebMARGHERITA LELLI–CHIESA ABSTRACT.We show that the Brill-Noether locus M3 18;16 is an irreducible component of the Gieseker-Petri locus in genus 18 having codimension 2 in the moduli space of curves. This result disproves a conjecture predicting that the Gieseker-Petri locus is always divisorial. 1. INTRODUCTION The Gieseker-Petri locus GP http://people.disim.univaq.it/~margherita_lellichiesa/cv.pdf
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WebThe institution was founded in 1968 as Maranatha Baptist Bible College by B. Myron Cedarholm. The college was named for the Aramaic phrase Maranatha, which means … WebMargherita lelli-chiesa; Joan Pons-Llopis; In this paper we construct Ulrich bundles of low rank on three-dimensional scrolls (with respect to the tautological line bundle). We pay special ... linsey davis new book
BRILL-NOETHER METHODS IN THE STUDY OF HYPER …
WebIn the seminar I will present joint work with Margherita Lelli-Chiesa (arXiv:1901.07603) where we prove that this holds true if and only if d_2 is not divisible by 4. In the cases where d_2 is a multiple of 4, we show the existence of curves in L having a triple, 4-tuple or 6-tuple point, and prove that these are the only types of unnodal ... [email protected]: Indirizzo: Largo San Leonardo Murialdo 1: Struttura/Afferenza: Dipartimento di Matematica e Fisica; Cariche e responsabilità: … WebCURRICULUM VITAE MARGHERITA LELLI-CHIESA Part I – General Information. Full Name: Margherita Lelli–Chiesa Place of Birth: Pescara (PE), Italy Date of birth: 16/02/1986 E-mail: [email protected], [email protected] Spoken Languages: Italian, English, German. Part II – Research Interests. Research Area: Algebraic Geometry. house cleaning services in bad axe michigan