Problem book

H. Blaine Lawson; John Ryan; Pascal Auscher; Terrance Tao; Palle E.T. Jorgensen; Nikolai Vasilevski; Michael Shapiro; Zhijian Wu; Tao Qian; Pertti Lounesto; Klaus Gürlebeck; Wolfgang Sprößig; Marius Mitrea; Josefina Alvarez; Zhenyuan Xu; Daniel B. Dix; Stephen Semmes; Rodolfo H. Torres; Grant Welland; William M. Pezzaglia; Heinz Leutwiler; R. P. Gilbert; Chiping Zhou; Bernhelm Booss-Bavnbeck; Krzysztoff P. Wojciechowski; T. Wolff

doi:10.4324/9781315139548

Problem book

H. Blaine Lawson
, John Ryan
, Pascal Auscher
, Terrance Tao
, Palle E.T. Jorgensen
, Nikolai Vasilevski
, Michael Shapiro
, Zhijian Wu
, Tao Qian
, Pertti Lounesto
, Klaus Gürlebeck
, Wolfgang Sprößig
, Marius Mitrea
, Josefina Alvarez
, Zhenyuan Xu
, Daniel B. Dix
, Stephen Semmes
, Rodolfo H. Torres
, Grant Welland
, William M. Pezzaglia

Heinz Leutwiler, R. P. Gilbert, Chiping Zhou, Bernhelm Booss-Bavnbeck, Krzysztoff P. Wojciechowski, T. Wolff

Mathematics

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Research output: Chapter in Book/Report/Conference proceeding › Chapter › peer-review

Abstract

Is there a reproducing kernel of Cauchy type for solutions to the Dirac equation over (spin) manifolds with negative curvature?.

Original language	English
Title of host publication	Clifford Algebras in Analysis and Related Topics
Publisher	CRC Press
Pages	17-32
Number of pages	16
ISBN (Electronic)	9781351460286
ISBN (Print)	0849384818, 9780849384813
DOIs	https://doi.org/10.4324/9781315139548
State	Published - Jan 1 2018

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Blaine Lawson, H., Ryan, J., Auscher, P., Tao, T., Jorgensen, P. E. T., Vasilevski, N., Shapiro, M., Wu, Z., Qian, T., Lounesto, P., Gürlebeck, K., Sprößig, W., Mitrea, M., Alvarez, J., Xu, Z., Dix, D. B., Semmes, S., Torres, R. H., Welland, G., ... Wolff, T. (2018). Problem book. In Clifford Algebras in Analysis and Related Topics (pp. 17-32). CRC Press. https://doi.org/10.4324/9781315139548

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title = "Problem book",

abstract = "Is there a reproducing kernel of Cauchy type for solutions to the Dirac equation over (spin) manifolds with negative curvature?.",

author = "\{Blaine Lawson\}, H. and John Ryan and Pascal Auscher and Terrance Tao and Jorgensen, \{Palle E.T.\} and Nikolai Vasilevski and Michael Shapiro and Zhijian Wu and Tao Qian and Pertti Lounesto and Klaus G{\"u}rlebeck and Wolfgang Spr{\"o}{\ss}ig and Marius Mitrea and Josefina Alvarez and Zhenyuan Xu and Dix, \{Daniel B.\} and Stephen Semmes and Torres, \{Rodolfo H.\} and Grant Welland and Pezzaglia, \{William M.\} and Heinz Leutwiler and Gilbert, \{R. P.\} and Chiping Zhou and Bernhelm Booss-Bavnbeck and Wojciechowski, \{Krzysztoff P.\} and T. Wolff",

note = "Publisher Copyright: {\textcopyright} 1996 by CRC Press, Inc.",

year = "2018",

month = jan,

day = "1",

doi = "10.4324/9781315139548",

language = "English",

isbn = "0849384818",

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Blaine Lawson, H, Ryan, J, Auscher, P, Tao, T, Jorgensen, PET, Vasilevski, N, Shapiro, M, Wu, Z, Qian, T, Lounesto, P, Gürlebeck, K, Sprößig, W, Mitrea, M, Alvarez, J, Xu, Z, Dix, DB, Semmes, S, Torres, RH, Welland, G, Pezzaglia, WM, Leutwiler, H, Gilbert, RP, Zhou, C, Booss-Bavnbeck, B, Wojciechowski, KP & Wolff, T 2018, Problem book. in Clifford Algebras in Analysis and Related Topics. CRC Press, pp. 17-32. https://doi.org/10.4324/9781315139548

TY - CHAP

T1 - Problem book

AU - Blaine Lawson, H.

AU - Ryan, John

AU - Auscher, Pascal

AU - Tao, Terrance

AU - Jorgensen, Palle E.T.

AU - Vasilevski, Nikolai

AU - Shapiro, Michael

AU - Wu, Zhijian

AU - Qian, Tao

AU - Lounesto, Pertti

AU - Gürlebeck, Klaus

AU - Sprößig, Wolfgang

AU - Mitrea, Marius

AU - Alvarez, Josefina

AU - Xu, Zhenyuan

AU - Dix, Daniel B.

AU - Semmes, Stephen

AU - Torres, Rodolfo H.

AU - Welland, Grant

AU - Pezzaglia, William M.

AU - Leutwiler, Heinz

AU - Gilbert, R. P.

AU - Zhou, Chiping

AU - Booss-Bavnbeck, Bernhelm

AU - Wojciechowski, Krzysztoff P.

AU - Wolff, T.

PY - 2018/1/1

Y1 - 2018/1/1

N2 - Is there a reproducing kernel of Cauchy type for solutions to the Dirac equation over (spin) manifolds with negative curvature?.

AB - Is there a reproducing kernel of Cauchy type for solutions to the Dirac equation over (spin) manifolds with negative curvature?.

UR - https://www.scopus.com/pages/publications/85053529802

U2 - 10.4324/9781315139548

DO - 10.4324/9781315139548

M3 - Chapter

AN - SCOPUS:85053529802

SN - 0849384818

SN - 9780849384813

SP - 17

EP - 32

BT - Clifford Algebras in Analysis and Related Topics

PB - CRC Press

ER -

Problem book

Abstract

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