nach oben

Erschienen in:

2016 | OriginalPaper | Buchkapitel

4. Differentiability and Structure, Renormings

verfasst von : Antonio J. Guirao, Vicente Montesinos, Václav Zizler

Erschienen in: Open Problems in the Geometry and Analysis of Banach Spaces

Verlag: Springer International Publishing

Einloggen

Aktivieren Sie unsere intelligente Suche, um passende Fachinhalte oder Patente zu finden.

search-config

KI-gestützte Suche

Aus

Abstract

In this chapter we review some problems on smoothness, rotundity, and its connection to the structure of spaces. We recommend, for example, [BenLin00, DeGoZi93, Fa97, FHHMZ11, HMVZ08], and the recent book [HaJo14] for this area.

Sie haben noch keine Lizenz? Dann Informieren Sie sich jetzt über unsere Produkte:

Springer Professional "Wirtschaft+Technik"

Online-Abonnement

Mit Springer Professional "Wirtschaft+Technik" erhalten Sie Zugriff auf:

über 102.000 Bücher
über 537 Zeitschriften

aus folgenden Fachgebieten:

Automobil + Motoren
Bauwesen + Immobilien
Business IT + Informatik
Elektrotechnik + Elektronik
Energie + Nachhaltigkeit
Finance + Banking
Management + Führung
Marketing + Vertrieb
Maschinenbau + Werkstoffe
Versicherung + Risiko

Jetzt Wissensvorsprung sichern!

Jetzt informieren

Springer Professional "Technik"

Online-Abonnement

Mit Springer Professional "Technik" erhalten Sie Zugriff auf:

über 67.000 Bücher
über 390 Zeitschriften

aus folgenden Fachgebieten:

Automobil + Motoren
Bauwesen + Immobilien
Business IT + Informatik
Elektrotechnik + Elektronik
Energie + Nachhaltigkeit
Maschinenbau + Werkstoffe

Jetzt Wissensvorsprung sichern!

Jetzt informieren

Springer Professional "Wirtschaft"

Online-Abonnement

Mit Springer Professional "Wirtschaft" erhalten Sie Zugriff auf:

über 67.000 Bücher
über 340 Zeitschriften

aus folgenden Fachgebieten:

Bauwesen + Immobilien
Business IT + Informatik
Finance + Banking
Management + Führung
Marketing + Vertrieb
Versicherung + Risiko

Jetzt Wissensvorsprung sichern!

Jetzt informieren

Vorheriges Kapitel Biorthogonal Systems

Nächstes Kapitel Nonlinear Geometry

[Aco99]

M.D. Acosta, Denseness of norm attaining operators into strictly convex spaces. Proc. R. Soc. Edinb. A 129, 1107–1114 (1999)MathSciNetMATHCrossRef

[Aco06]

M.D. Acosta, Denseness of norm attaining mappings. Rev. R. Acad. Cienc. Exactas Fís. Nat. Ser. A Math. RACSAM 100 (1–2), 9–30 (2006)MathSciNetMATH

[AcAgPa96]

A.D. Acosta, F.J. Aguirre, R. Payá, There is no bilinear Bishop-Phelps theorem. Isr. J. Math. 93, 221–227 (1996)MathSciNetMATHCrossRef

[AAAG07]

M.D. Acosta, A. Aizpuru, R.M. Aron, F.J. García-Pacheco, Functionals that do not attains their norm. Bull. Belg. Math. Soc. Simon Stevin 14 (3), 407–418 (2007)MathSciNetMATH

[AcoKa11]

M.D. Acosta, V. Kadets, A characterization of reflexive spaces. Math. Ann. 349, 577–588 (2011)MathSciNetMATHCrossRef

[AcoMon07]

M.D. Acosta, V. Montesinos, On a problem of Namioka on norm-attaining functionals. Math. Z. 256, 295–300 (2007)MathSciNetMATHCrossRef

[ArMe93]

S.A. Argyros, S.K. Mercourakis, On weakly Lindelöf Banach spaces. Rocky Mt. J. Math. 23, 395–446 (1993)MathSciNetMATHCrossRef

[AJR13]

J.M. Aron, J.A. Jaramillo, T. Ransford, Smooth surjections without surjective restrictions. J. Geom. Anal. 23, 2081–2090 (2013)MathSciNetMATHCrossRef

[Arsz76]

N. Aronszajn, Differentiability of Lipschitzian mappings between Banach spaces. Stud. Math. 57, 147–190 (1976)MathSciNetMATH

[As68]

E. Asplund, Fréchet differentiability of convex functions. Acta Math. 121, 31–47 (1968)MathSciNetMATHCrossRef

[Aza97]

D. Azagra, Diffeomorphisms between spheres and hyperplanes in infinite-dimensional Banach spaces. Stud. Math. 125 (2), 179–186 (1997)MathSciNetMATH

[ADJ03]

D. Azagra, R. Deville, M. Jiménez-Sevilla, On the range of the derivatives of a smooth function between Banach spaces. Math. Proc. Camb. Philos. Soc. 134 (1), 163–185 (2003)MathSciNetMATHCrossRef

[AzaMu15]

D. Azagra, C. Mudarra, Global approximation of convex functions by differentiable convex functions on Banach spaces. J. Convex Anal. 22 (4), 1197–1205 (2015)MathSciNetMATH

[BaGo06]

P. Bandyopadhyay, G. Godefroy, Linear structures in the set of norm-attaining functionals on a Banach space. J. Convex Anal. 13 (3–4), 489–497 (2006)MathSciNetMATH

[BaHa08]

M. Bačák, P. Hájek, Mazur intersection property for Asplund spaces. J. Funct. Anal. 255, 2090–2094 (2008)MathSciNetMATHCrossRef

[Bat97]

S.M. Bates, On smooth, nonlinear surjections of Banach spaces. Isr. J. Math. 100, 209–220 (1997)MathSciNetMATHCrossRef

[BenLin00]

Y. Benyamini, J. Lindenstrauss, Geometric Nonlinear Functional Analysis, Vol. I. Colloquium Publications, vol. 48 (American Mathematical Society, Providence, 2000)

[BiSm16]

V. Bible, R.R. Smith, Smooth and polyhedral approximation in Banach spaces. J. Math. Anal. Appl. 435 (2), 1262–1272 (2016)MathSciNetMATHCrossRef

[BiPhe61]

E. Bishop, R.R. Phelps, A proof that every Banach space is subreflexive. Bull. Am. Math. Soc. 67, 97–98 (1961)MathSciNetMATHCrossRef

[BorFa93]

J.M. Borwein, M. Fabian, On convex functions having points of Gâteaux differentiability which are not points of Fréchet differentiability. Can. J. Math. 45 (6), 1121–1134 (1993)MathSciNetMATHCrossRef

[BorNo94]

J.M. Borwein, D. Noll, Second order differentiability of convex functions: A. D. Alexandrov’s theorem in Hilbert space. Trans. Am. Math. Soc. 342, 43–81 (1994)MathSciNetMATHCrossRef

[BorVan10]

J.M. Borwein, J.D. Vanderwerff, Convex Functions: Constructions, Characterizations and Counterexamples (Cambridge University Press, Cambridge, 2010)MATHCrossRef

[BGK96]

B. Bossard, G. Godefroy, R. Kaufman, Hurewicz’s theorems and renormings of Banach spaces. J. Funct. Anal. 140, 142–150 (1996)MathSciNetMATHCrossRef

[Bou77]

J. Bourgain, On dentability and the Bishop-Phelps property. Isr. J. Math. 78 (4), 265–271 (1977)MathSciNetMATHCrossRef

[Bou80]

J. Bourgain, Dentability and finite dimensional decompositions. Stud. Math. 67 (2), 135–148 (1980)MathSciNetMATH

[Bour83]

R.D. Bourgin, Geometric Aspects of Convex Sets with the Radon–Nikodým Property. Lecture Notes in Mathematics, vol. 993 (Springer, Berlin, 1983)

[Chr72]

J.P.R. Christensen, On sets of Haar measure zero in Abelian Polish groups. Isr. J. Math. 13, 255–260 (1972)MathSciNetCrossRef

[CorLin66]

H.H. Corson, J. Lindenstrauss, On weakly compact subsets of Banach spaces. Proc. Am. Math. Soc. 17, 407–412 (1966)MathSciNetMATHCrossRef

[BerVe09]

C.A. De Bernardi, L. Veselý, On support points and support functionals of convex sets. Isr. J. Math. 171, 15–27 (2009)MathSciNetMATHCrossRef

[De87]

R. Deville, Un théorème de transfert pour la propriété des boules. Can. Math. Bull. 30, 295–300 (1987)MathSciNetMATHCrossRef

[DGHZ87]

R. Deville, G. Godefroy, D.E.G. Hare, V. Zizler, Differentiability of convex functions and the convex point of continuity property. Isr. J. Math. 59, 245–255 (1987)MathSciNetMATHCrossRef

[DeGoZi90]

R. Deville, G. Godefroy, V. Zizler, The three space problem for smooth partitions of unity and C(K) spaces. Math. Ann. 288, 613–625 (1990)MathSciNetMATHCrossRef

[DeGoZi93]

R. Deville, G. Godefroy, V. Zizler, Smoothness and Renormings in Banach Spaces. Pitman Monographs, vol. 64 (London, Longman, 1993)

[DeGoZi93b]

R. Deville, G. Godefroy, V. Zizler, Smooth bump functions and the geometry of Banach spaces. Mathematika 40, 305–321 (1993)MathSciNetMATHCrossRef

[DeHa05]

R. Deville, P. Hájek, On the range of the derivative of Gâteaux-smooth functions on separable Banach spaces. Isr. J. Math. 145, 257–269 (2005)MATHCrossRef

[DeIvLa15]

R. Deville, I. Ivanov, S. Lajara, Construction of pathological Gâteaux differentiable functions. Proc. Am. Math. Soc. 143 (1), 129–139 (2015)MathSciNetMATHCrossRef

[Edg79]

G.A. Edgar, A long James space, in Proceedings Conference Oberwolfach 1979. Lecture Notes in Mathematics, vol. 794 (Springer, Berlin, 1979)

[Fa85]

M. Fabian, Lipschitz smooth points of convex functions and isomorphic characterizations of Hilbert spaces. Proc. Lond. Math. Soc. 51, 113–126 (1985)MathSciNetMATHCrossRef

[Fa97]

M. Fabian, Gâteaux Differentiability of Convex Functions and Topology—Weak Asplund Spaces (Wiley, New York, 1997)MATH

[FaGo88]

M. Fabian, G. Godefroy, The dual of every Asplund space admits a projectional resolution of idenity. Stud. Math. 91, 141–151 (1988)MathSciNetMATH

[FHHMZ11]

M. Fabian, P. Habala, P. Hájek, V. Montesinos, V. Zizler, Banach Space Theory: The Basis for Linear and Nonlinear Analysis. CMS Books in Mathematics (Canadian Mathematical Society/Springer, 2011)

[FMZ06]

M. Fabian, V. Montesinos, V. Zizler, Smoothness in Banach spaces. Selected problems. Rev. R. Acad. Cienc. Exactas Fís. Natl. Ser. A Math. RACSAM 100 (1–2), 101–125 (2006)MathSciNetMATH

[FMZ07]

M. Fabian, V. Montesinos, V. Zizler, Weak compactness and σ-Asplund generated Banach spaces. Stud. Math. 181, 125–152 (2007)MathSciNetMATHCrossRef

[FPWZ89]

M. Fabian, D. Preiss, J.H.M. Whitfield, V. Zizler, Separating polynomials on Banach spaces. Q. J. Math. Oxf. 40 (2), 409–422 (1989)MathSciNetMATHCrossRef

[FLP01]

V.P. Fonf, J. Lindenstrauss, R.R. Phelps, Infinite-Dimensional Convexity, ed. by W.B. Johnson, J. Lindenstrauss. Handbook of the Geometry of Banach Spaces I (Elsevier, Amsterdam, 2001), pp. 599–670

[FPST08]

V.P. Fonf, A.J. Pallarés, R.J. Smith, S.L. Troyanski, Polyhedral norms on non-separable Banach spaces. J. Funct. Anal. 255, 449–470 (2008)MathSciNetMATHCrossRef

[Fos92]

M. Fosgerau, A Banach space with Lipschitz Gâteaux smooth bump has weak* fragmentable dual. Ph.D Dissertation, The University College, London (1992)

[Fry04]

R. Fry, Approximation of functions with bounded derivative on Banach spaces. Bull. Aust. Math. Soc. 69, 125–131 (2004)MathSciNetMATHCrossRef

[Geo91]

P.G. Georgiev, On the residuality of the set of norms having Mazur’s intersection property. Math. Balkanica 5, 20–26 (1991)MathSciNetMATH

[Go87]

G. Godefroy, Boundaries of a convex set and interpolation sets. Math. Ann. 277, 173–194 (1987)MathSciNetMATHCrossRef

[Go00]

G. Godefroy, Some applications of Simons’ inequality. Serdica Math. J. 26, 59–78 (2000)MathSciNetMATH

[Go01]

G. Godefroy, Renormings of Banach Spaces ed. by W.B. Johnson, J. Lindenstrauss. Handbook of the Geometry of Banach Spaces I (Elsevier, Amsterdam, 2001), pp. 781–835

[Go01a]

G. Godefroy, The Banach space c ₀. Extracta Math. 16 (1), 1–25 (2001)MathSciNetMATH

[GoKal89]

G. Godefroy, N.J. Kalton, The ball topology and its applications. Contemp. Math. 85, 195–238 (1989)MathSciNetMATHCrossRef

[GoMZ95]

G. Godefroy, V. Montesinos, V. Zizler, Strong subdifferentiability of norms and geometry of Banach spaces. Comment. Math. Univ. Carol. 36 (3), 493–502 (1995)MathSciNetMATH

[Gow90]

W.T. Gowers, Symmetric block bases of sequences with large average growth. Isr. J. Math. 69, 129–151 (1990)MathSciNetMATHCrossRef

[GJM04]

A.S. Granero, M. Jiménez-Sevilla, J.P. Moreno, Intersections of closed balls and geometry of Banach spaces. Extracta Math. 19 (1), 55–92 (2004)MathSciNetMATH

[GHM10]

A.J. Guirao, P. Hájek, V. Montesinos, Ranges of operators and derivatives. J. Math. Anal. Appl. 367, 29–33 (2010)MathSciNetMATHCrossRef

[GMZ12]

A.J. Guirao, V. Montesinos, V. Zizler, On a classical renorming construction of V. Klee. J. Math. Anal. Appl. 385, 458–465 (2012)MathSciNetMATHCrossRef

[GMZ14]

A.J. Guirao, V. Montesinos, V. Zizler, On Preserved and Unpreserved Points, ed. by J.C. Ferrando, M.López-Pellicer. Descriptive Topology and Functional Analysis, in Honour of Jerzy Kakol’s 60th Birthday. Springer Proceedings in Mathematics & Statistics, vol. 80 (Springer, Berlin, 2014), pp. 163–193

[GMZ15]

A.J. Guirao, V. Montesinos, V. Zizler, A note on extreme points of C ^∞-smooth balls in polyhedral spaces. Proc. Am. Math. Soc. 143 (8), 3413–3420 (2015)MathSciNetMATHCrossRef

[GMZ]

A.J. Guirao, V. Montesinos, V. Zizler, Remarks on the set of norm-attaining functionals, to appear

[Ha77]

J. Hagler, A counterexample to several questions about Banach spaces. Stud. Math. 60, 289–308 (1977)MathSciNetMATH

[Haj98]

P. Hájek, Smooth functions on c ₀. Isr. J. Math. 104, 17–27 (1998)MATHCrossRef

[HaJo04]

P. Hájek, M. Johanis, Characterization of reflexivity by equivalent renorming. J. Funct. Anal. 211, 163–172 (2004)MathSciNetMATHCrossRef

[HaJo14]

P. Hájek, M. Johanis, Smooth Analysis in Banach Spaces (De Gruyter, Berlin, 2014)MATHCrossRef

[HMVZ08]

P. Hájek, V. Montesinos, J. Vanderwerff, V. Zizler, Biorthogonal Systems in Banach Spaces. CMS Books in Mathematics (Canadian Mathematical Society/Springer, 2008)

[HMZ12]

P. Hájek, V. Montesinos, V. Zizler, Geometry and Gâteaux smoothness in separable Banach spaces. Oper. Matrices 6 (2), 201–232 (2012)MathSciNetMATHCrossRef

[Hay90]

R. Haydon, A counterexample to several questions about scattered compact spaces. Bull. Lond. Math. Soc. 22, 261–268 (1990)MathSciNetMATHCrossRef

[Hay99]

R. Haydon, Trees in Renorming Theory. Proc. Lond. Math. Soc. 78 (3), 541–584 (1999)MathSciNetMATHCrossRef

[Hay08]

R. Haydon, Locally uniformly rotund norms in Banach spaces and their duals. J. Funct. Anal. 254, 2023–2039 (2008)MathSciNetMATHCrossRef

[Hu80]

R.E. Huff, On non-density of norm-attaining operators. Rev. Roum. Math. Pures Appl. 25, 239–241 (1980)MathSciNetMATH

[HuMo75]

R.E. Huff, P.D. Morris, Dual spaces with the Krein–Milman property have the Radon–Nikodým property. Proc. Am. Math. Soc. 49, 104–108 (1975)MathSciNetMATH

[JM97]

M. Jiménez-Sevilla, J.P. Moreno, Renorming Banach paces with the Mazur intersection property. J. Funct. Anal. 144, 486–504 (1997)MathSciNetMATHCrossRef

[JoWo79]

J. Johnson, J. Wolfe, Norm attaining operators. Stud. Math. 65, 7–19 (1979)MathSciNetMATH

[JoLin74]

W.B. Johnson, J. Lindenstrauss, Some remarks on weakly compactly generated Banach spaces. Isr. J. Math. 17, 219–230 (1974)MathSciNetMATHCrossRef

[Kau91]

R. Kaufman, Topics on analytic sets. Fundam. Math. 139, 215–229 (1991)MathSciNetMATH

[KMS01]

P.S. Kenderov, W.B. Moors, S. Sciffer, A weak Asplund space whose dual is not weak^∗ fragmentable. Proc. Am. Math. Soc. 192, 3741–3757 (2001)MathSciNetMATHCrossRef

[Klee59]

V. Klee, Some new results on smoothness and rotundity in normed linear spaces. Math. Ann. 139, 51–63 (1959)MathSciNetMATHCrossRef

[Kur11]

O. Kurka, Structure of the set of norm attaining functionals on strictly convex spaces. Can. Math Bull. 54 (2), 302–310 (2011)MathSciNetMATHCrossRef

[Lin63]

J. Lindenstrauss, On operators which attain their norm. Isr. J. Math. 3, 139–148 (1963)MathSciNetMATHCrossRef

[LPT12]

J. Lindenstrauss, D. Preiss, J. Tišer, Fréchet Differentiability of Lipschitz Functions and Porous Sets in Banach Spaces. Annals of Mathematics Studies, vol. 179 (Princeton University Press, Princeton 2012)

[LinTza77]

J. Lindenstrauss, L. Tzafriri, Classical Banach Spaces I. Sequence Spaces (Springer, Berlin, 1977)

[Lo00]

V. Lomonosov, A counterexample to the Bishop–Phelps theorem in complex spaces. Isr. J. Math. 115, 25–28 (2000)MathSciNetMATHCrossRef

[Man73]

P. Mankiewicz, On the differentiability of Lipschitz mappings in Fréchet spaces. Stud. Math. 45, 15–29 (1973)MathSciNetMATH

[Mar14]

M. Martín, Norm-attaining compact operators. J. Funct. Anal. 267, 1585–1592 (2014)MathSciNetMATHCrossRef

[MaPl05]

V.K. Maslyuchenko, A.M. Plichko, Some open problems in functional analysis and function theory. Extracta Math. 20 (1), 51–70 (2005)MathSciNetMATH

[Mat97]

E. Matoušková, Convexity of Haar null sets. Proc. Am. Math. Soc. 125, 1793–1799 (1997)MathSciNetMATHCrossRef

[Mat99]

E. Matoušková, An almost nowhere Fréchet smooth norm on superreflexive spaces. Stud. Math. 133 (1), 93–99 (1999)MATH

[MatSt96]

E. Matoušková, C. Stegall, A characterization of reflexive Banach spaces. Proc. Am. Math. Soc. 124, 1083–1090 (1996)MathSciNetMATHCrossRef

[Maz33]

S. Mazur, Über schwache Konvergentz in den Raumen L ^p. Stud. Math. 4, 128–133 (1933)MATH

[Megg98]

R.E. Megginson, An Introduction to Banach Space Theory. Graduate Texts in Mathematics, vol. 183 (Springer, Berlin, 1998)

[Mil72]

V.D. Milman, Geometric theory of Banach spaces. II: Geometry of the unit sphere. Russ. Math. Surv. 26, 79–163 (1972)

[MOTV09]

A. Moltó, J. Orihuela, S.L. Troyanski, M. Valdivia, A Non-Linear Transfer Technique for Renorming. Lecture Notes in Mathematics, vol. 1951 (Springer, Berlin, 2009)

[MoSu06]

W.B. Moors, S. Somasundaram, A Gâteaux differentiability space that is not weak Asplund. Proc. Am. Math. Soc. 134, 2745–2754 (2006)MathSciNetMATHCrossRef

[Mo]

P. Morris, Disapperance of extreme points. Proc. Am. Math. Soc. 88 (2), 244–246 (1983)MATHCrossRef

[OST]

J. Orihuela, R.J. Smith, S.L. Troyanski, Strictly convex norms and topology. Proc. Lond. Math. Soc. 104 (3), 197–222 (2012)MathSciNetMATHCrossRef

[Pe57]

A. Pełczyński, A property of multilinear operations. Stud. Math. 16 (2), 173–182 (1957)MathSciNetMATH

[Ph57]

R.R. Phelps, Subreflexive normed linear spaces. Arch. Math. 8, 444–450 (1957)MathSciNetMATHCrossRef

[Ph60]

R.R. Phelps, A representation theorem for bounded convex sets. Proc. Am. Math. Soc. 11, 976–983 (1960)MathSciNetMATHCrossRef

[Piet09]

A. Pietsch, Long-standing open problems of Banach space theory. Quaest. Math. 32, 321–327 (2009)MathSciNetMATHCrossRef

[Pr90]

D. Preiss, Differentiability of Lipschitz functions on Banach spaces. J. Funct. Anal. 91, 312–345 (1990)MathSciNetMATHCrossRef

[PrTi95]

D. Preiss, J. Tišer, Two unexpected examples concerning differentiability of Lipschitz functions in Banach spaces, in Geometric Aspects of Functional Analysis (Israel, 1992–1994), ed. by J. Lindenstrauss, V. Milman. Operator Theory: Advances and Applications, vol. 77 (Birkhäuser, Boston, 1995), pp. 219–235

[PrZa84]

D. Preiss, L. Zajíček, Fréchet differentiation of convex functions in a Banach space with a separable dual. Proc. Am. Math. Soc. 91, 202–204 (1984)MATH

[Rm]

M. Rmoutil, Norm-attaining functionals and proximinal subspaces, to appear

[Ro03]

H.P. Rosenthal, The Banach Space C(K), ed. by W.B. Johnson, J. Lindenstrauss. Handbook of the Geometry of Banach Spaces II (Elsevier, Amsterdam, 2003), pp. 1549–1602

[Sch83]

W. Schachermayer, Norm Attaining Operators on some Classical Banach spaces. Pac. J. Math. 105, 427–438 (1983)MathSciNetMATHCrossRef

[Sch87]

W. Schachermayer, The Radon–Nikodým property and the Krein-Milman property are equivalent for strongly regular sets. Trans. Am. Math. Soc. 303 (2), 673–687 (1987)MathSciNetMATH

[SSW89]

W. Schachermayer, A. Sersouri, E. Werner, Moduli of non-dentability and the Radon–Nikodým property in Banach spaces. Isr. J. Math. 65, 225–257 (1989)MathSciNetMATHCrossRef

[Smi07]

R.J. Smith, Trees, Gâteaux norms and a problem of Haydon. J. Lond. Math. Soc. 76 (2), 633–646 (2007)MathSciNetMATHCrossRef

[SmiTr10]

R.J. Smith, S.L. Troyanski, Renormings of C(K) spaces. Rev. R. Acad. Cienc. Exactas Fís. Natl. Ser. A Math. RACSAM 104 (2), 375–412 (2010)MathSciNetMATHCrossRef

[Ta86]

M. Talagrand, Renormages de quelques C(K). Isr. J. Math. 54, 327–334 (1986)MathSciNetMATHCrossRef

[Tan96]

W.-K. Tang, A note on preserved smoothness. Serdica Math. J. 22, 29–32 (1996)MathSciNetMATH

[Tro70]

S.L. Troyanski, An example of a smooth space, the dual of which is not strictly convex. Stud. Math. 35, 305–309 (1970) (in Russian)MathSciNet

[Tro90]

S.L. Troyanski, Gâteaux differentiable norms in L _p. Math. Ann. 287, 221–227 (1990)MathSciNetMATHCrossRef

[Van92]

J. Vanderwerff, Fréchet differentiable norms on spaces of countable dimension. Arch. Math. 58, 471–476 (1992)MathSciNetMATHCrossRef

[Van93]

J. Vanderwerff, Second order Gâteaux differentiability and an isomorphic characterization of Hilbert spaces. Q. J. Math. 44 (2), 249–255 (1993)MathSciNetMATHCrossRef

[Vas81]

L. Vašák, On a generalization of weakly compactly generated Banach spaces. Stud. Math. 70, 11–19 (1981)MathSciNetMATH

[Zip03]

M. Zippin, Extension of Bounded Linear Operators, ed. by W.B. Johnson, J. Lindenstrauss. Handbook of the Geometry of Banach Spaces II (Elsevier, Amsterdam, 2003), pp. 1703–1742

[Ziz73]

V. Zizler, On some extremal problems in Banach spaces. Math. Scand. 32, 214–224 (1973)MathSciNetMATH

[Ziz86]

V. Zizler, Renormings concerning Mazur’s intersection property of balls for weakly compact convex sets. Math. Ann. 276 (1), 61–66 (1986)MathSciNetMATHCrossRef

[Ziz03]

V. Zizler, Nonseparable Banach Spaces, ed. by W.B. Johnson, J. Lindenstrauss. Handbook of the Geometry of Banach Spaces II (Elsevier, Amsterdam, 2003), pp. 1743–1816

Titel: Differentiability and Structure, Renormings
verfasst von: Antonio J. Guirao
Vicente Montesinos
Václav Zizler
Verlag: Springer International Publishing
Buch: Open Problems in the Geometry and Analysis of Banach Spaces
Print ISBN: 978-3-319-33571-1

Electronic ISBN: 978-3-319-33572-8

Copyright-Jahr: 2016
DOI: https://doi.org/10.1007/978-3-319-33572-8_4

Springer Professional

Abstract

Bitte loggen Sie sich ein, um Zugang zu Ihrer Lizenz zu erhalten.

Sie haben noch keine Lizenz? Dann Informieren Sie sich jetzt über unsere Produkte:

Springer Professional "Wirtschaft+Technik"

Springer Professional "Technik"

Springer Professional "Wirtschaft"