Matt Stenzel
Research interests: Grauert tubes, the heat equation, analysis
on symmetric spaces.
Publications
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A proof of a Theorem of Boutet de Monvel.
Matthew B. Stenzel. Submitted (2012).
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A reconstruction
theorem for Riemannian symmetric spaces of non-compact type.
Matthew B. Stenzel. Journal of Fourier Analysis and Applications 15 (2009), no. 6, p. 839-856.
- An inversion
formula for the Segal-Bargmann transform on a symmetric space of
non-compact type. Matthew B. Stenzel. Journal of Functional
Analysis 240 (2006), 592--608. (Contains some last minute changes
that didn't make it to the print version.)
-
Sharp bounds for the heat
kernel on certain symmetric spaces of non-compact type. Brian Hall
and Matthew B. Stenzel. Contemporary Mathematics, Volume
317, 2003.
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Chains on the boundary of a Grauert
tube. Matthew B. Stenzel.
Mathematische Annalen 322, 383-399 (2002).
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The Segal-Bargmann transform
on a symmetric space of compact type. Matthew B. Stenzel.
Journal of Functional Analysis 165, 45-58 (1999).
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Asymptotic curvature of
theta-metrics. Matthew B. Stenzel. Annals of Global Analysis
and Geometry 15 243-262 (1997).
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Intrinsic microlocal analysis and
inversion formulae for the heat equation on compact real-analytic Riemannian
manifolds. Eric Leichtnam, Francois Golse and Matthew B. Stenzel.
Annales Scientifiques de L'Ecole Normale Superieure 4e serie, t. 29
(1996) 669-736.
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Ricci-flat metrics on the
complexification of a rank one symmetric space. Matthew
B. Stenzel. Manuscripta Math. 80, 151--163 (1993).
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Grauert tubes and the homogeneous Monge-Ampere equation II. Victor
Guillemin and Matthew B. Stenzel. Journal of Differential Geometry 35
(1992) 627--641.
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Grauert tubes and the homogeneous Monge-Ampere equation. By Victor Guillemin
and Matthew B. Stenzel.
Journal of Differential Geometry 34 (1991) 561--570.
-
Kahler structures on cotangent bundles of real analytic Riemannian
manifolds. Matthew B. Stenzel. Ph.D. thesis, MIT (1990).
Curriculum Vita
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