|Table of Contents|

[1] Shi Ping, Ma Jipu,. Generalized regular points of a C1 1map between Banach spaces [J]. Journal of Southeast University (English Edition), 2007, 23 (1): 148-150. [doi:10.3969/j.issn.1003-7985.2007.01.030]
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Generalized regular points of a C1 1map between Banach spaces()
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Journal of Southeast University (English Edition)[ISSN:1003-7985/CN:32-1325/N]

Volumn:
23
Issue:
2007 1
Page:
148-150
Research Field:
Mathematics, Physics, Mechanics
Publishing date:
2007-03-30

Info

Title:
Generalized regular points of a C1 1map between Banach spaces
Author(s):
Shi Ping1 Ma Jipu2
1Department of Applied Mathematics, Nanjing University of Finance and Economics, Nanjing 210003, China
2Department of Mathematics, Nanjing University, Nanjing 210093, China
Keywords:
Banach space bounded linear operator generalized inverse index generalized regular point semi-Fredholm map
PACS:
O177.91
DOI:
10.3969/j.issn.1003-7985.2007.01.030
Abstract:
Let f be a C1 1map between two Banach spaces E and F.It has been proved that the concept of generalized regular points of f, which is a generalization of the notion of regular points of f, has some crucial applications in nonlinearity and global analysis.We characterize the generalized regular points of f using the three integer-valued(or infinite)indices M(x00), Mcc(x00)and Mrr(x00)at x0∈E 0generated by f and by analyzing generalized inverses of bounded linear operators on Banach spaces, that is, if f〓 ′(x00)has a generalized inverse in the Banach space B(E, F)of all bounded linear operators on E into F and at least one of the indices M(x00), Mcc(x00)and Mrr(x00)is finite, then x0 0is a generalized regular point of f if and only if the multi-index(M(x), Mcc(x), Mrr(x))is continuous at x00.

References:

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[8] Shi Ping, Ma Jipu.A note on a problem of M.S.Berger [J].Northeast Math J, 2003, 19(4):366-370.
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Memo

Memo:
Biography: Shi Ping(1963—), male, associate professor, pshi@eyou.com.
Last Update: 2007-03-20