Une suite exacte en L 2 -cohomologie

Gilles Carron

Séminaire de théorie spectrale et géométrie (1995-1996)

  • Volume: 14, page 59-64
  • ISSN: 1624-5458

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Carron, Gilles. "Une suite exacte en $L^2$-cohomologie." Séminaire de théorie spectrale et géométrie 14 (1995-1996): 59-64. <http://eudml.org/doc/114393>.

@article{Carron1995-1996,
author = {Carron, Gilles},
journal = {Séminaire de théorie spectrale et géométrie},
keywords = {complete Riemannian variety; cohomology},
language = {fre},
pages = {59-64},
publisher = {Institut Fourier},
title = {Une suite exacte en $L^2$-cohomologie},
url = {http://eudml.org/doc/114393},
volume = {14},
year = {1995-1996},
}

TY - JOUR
AU - Carron, Gilles
TI - Une suite exacte en $L^2$-cohomologie
JO - Séminaire de théorie spectrale et géométrie
PY - 1995-1996
PB - Institut Fourier
VL - 14
SP - 59
EP - 64
LA - fre
KW - complete Riemannian variety; cohomology
UR - http://eudml.org/doc/114393
ER -

References

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  1. [B-M-S] N.V. BORISOV, W. MULLER, R. SCHRADER. - Relative index theorems and supersymmetric scattering theory, Comm. math. Phys. 114 ( 1988), 475-513. Zbl0663.58032MR929141
  2. [Br] J. BRÜNING. - L2 -index theorems on a certain complete manifold, J. Differential Geometry 32 ( 1990), 491-532. Zbl0722.58043MR1072916
  3. [C1] G. CARRON. - L2-cohomologie et inégalités de Soboiev, Prépublication de l'Institut Fourier n° 306, Grenoble, 1994. 
  4. [C2] G. CARRON. - Une suite exacte en L2 -cohomologie, Prépublication n°174 de l'ENS Lyon., 1995. 
  5. [D] H. DONNELY. - Essential spectrum and heat kernel, J.Funci. Anal. 75 ( 1987), 362-381. Zbl0634.58031MR916757
  6. [D-S] G. DUFF, D.C. SPENCER. - Harmonic Tensors on Riemannian Manifolds with boundary. Ann.of Math. Stud. 56, n°1 ( 1952), 115-127. Zbl0049.18804MR48137
  7. [G-L] M. GROMOV, H.B. LAWSON JR. - Positive scalar curvature and the Dirac operator on a complete Riemannian manifold, Publ. Math. I.H.E.S. 58 ( 1983). 83-196. Zbl0538.53047
  8. [Lo] J. LOTT. - L2 -cohomology of geometricaliy infinite hyperbolic 3-manifold, to appear in GAFA. Zbl0873.57014MR1437474

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