| Record ID | marc_columbia/Columbia-extract-20221130-034.mrc:45716934:2148 |
| Source | marc_columbia |
| Download Link | /show-records/marc_columbia/Columbia-extract-20221130-034.mrc:45716934:2148?format=raw |
LEADER: 02148cam a2200409 i 4500
001 16685158
005 20220817142759.0
008 220524s2022 fr b 000 0 eng d
035 $a(OCoLC)on1334674771
040 $aPAU$beng$erda$cPAU$dFUG$dUCIDS$dNNC
020 $a9782856299531$qpaperback
020 $a2856299539$qpaperback
035 $a(OCoLC)1334674771
041 0 $aeng$beng$bfre
050 4 $aQA1$b.A85 v.431
049 $aZCUA
100 1 $aGuignard, Quentin,$eauthor.
245 10 $aGeometric local [epsilon]-factors /$cQuentin Guignard.
246 3 $aGeometric local e-factors
264 1 $aParis :$bSociété mathématique de France,$c[2022?]
300 $a137 pages ;$c24 cm.
336 $atext$2rdacontent
337 $aunmediated$2rdamedia
338 $avolume$2rdacarrier
490 1 $aAstérisque,$x0303-1179 ;$vnuméro 431, 2022
500 $a"Texte reçu le 19 juillet 2019, modifié le 26 décembre 2020 et accepté le 12 janvier 2021" -- tp verso.
504 $aIncludes bibliographical references (pages 135-137).
540 $aCurrent Copyright Fee: GBP22.50$c0.$5Uk
546 $aEnglish text with English and French abstracts.
650 0 $aGeometry, Algebraic.
650 0 $aNumber theory.
650 7 $aGeometry, Algebraic.$2fast$0(OCoLC)fst00940902
650 7 $aNumber theory.$2fast$0(OCoLC)fst01041214
710 2 $aSociété mathématique de France,$eissuing body.
830 0 $aAstérisque ;$v431.
880 $6520-00$aInspired by the work of Laumon on local ε-factors and by Deligne's 1974 letter to Serre, we give an explicit cohomological definition of ε-factors for ℓ-adic Galois representations over henselian discrete valuation fields of positive equicharacteristic p≠ℓ, with (not necessarily finite) perfect residue fields. These geometric local ε-factors are completely characterized by an explicit list of purely local properties, such as an induction formula and the compatibility with geometric class field theory in rank 1, and satisfy a product formula for ℓ-adic sheaves on a curve over a perfect field of characteristic p.
852 00 $bmat$hQA1$i.A82 v.431