Banach-Stone Theorem for isometries on spaces of vector-valued differentiable functions

Let Q⊆Rm, K⊆Rn be open sets, p,q∈N, 1≤r<∞ and let E,F be Banach spaces. Denote by C⁎p(Q,E)r the space of all f∈Cp(Q,E) with bounded derivatives of order ≤p, endowed with the norm ‖f‖=sups∈Q⁡‖[(‖∂λf(s)‖E)λ∈Λ]‖r, where ‖⋅‖r denotes the ℓr norm on RΛ, Λ={λ:|λ|≤p}. Let T:C⁎p(Q,E)r→C⁎q(K,F)r be a line...

Full description

Saved in:

Bibliographic Details
Main Authors:	Leung, Denny H., Ng, Hong Wai, Tang, Wee Kee
Other Authors:	School of Physical and Mathematical Sciences
Format:	Article
Language:	English
Published:	2022
Subjects:	Science::Mathematics Vector-Valued Differentiable Biseparating Maps
Online Access:	https://hdl.handle.net/10356/162444
Tags:	Add Tag No Tags, Be the first to tag this record!
Institution:	Nanyang Technological University
Language:	English

id	sg-ntu-dr.10356-162444
record_format	dspace
spelling	sg-ntu-dr.10356-1624442023-02-28T20:03:59Z Banach-Stone Theorem for isometries on spaces of vector-valued differentiable functions Leung, Denny H. Ng, Hong Wai Tang, Wee Kee School of Physical and Mathematical Sciences Science::Mathematics Vector-Valued Differentiable Biseparating Maps Let Q⊆Rm, K⊆Rn be open sets, p,q∈N, 1≤r<∞ and let E,F be Banach spaces. Denote by C⁎p(Q,E)r the space of all f∈Cp(Q,E) with bounded derivatives of order ≤p, endowed with the norm ‖f‖=sups∈Q⁡‖[(‖∂λf(s)‖E)λ∈Λ]‖r, where ‖⋅‖r denotes the ℓr norm on RΛ, Λ={λ:\|λ\|≤p}. Let T:C⁎p(Q,E)r→C⁎q(K,F)r be a linear surjective isometry. Then m=n and p=q and there are a Cp-diffeomorphism τ:K→Q and Banach space isomorphisms V(t):E→F so that Tf(t)=V(t)f(τ(t)) if f∈C⁎p(Q,E),t∈K. The result holds in a more general setting. The proof establishes a direct link between isometries and biseparating maps. Ministry of Education (MOE) Published version Research of the second and third authors are supported by the Ministry of Education - Singapore, under its Academic Research Fund Tier 1 (AcRF project no. RG24/19(S)). 2022-10-19T04:47:10Z 2022-10-19T04:47:10Z 2022 Journal Article Leung, D. H., Ng, H. W. & Tang, W. K. (2022). Banach-Stone Theorem for isometries on spaces of vector-valued differentiable functions. Journal of Mathematical Analysis and Applications, 514(1), 126305-. https://dx.doi.org/10.1016/j.jmaa.2022.126305 0022-247X https://hdl.handle.net/10356/162444 10.1016/j.jmaa.2022.126305 2-s2.0-85129544306 1 514 126305 en RG24/19(S) Journal of Mathematical Analysis and Applications © 2022 The Author(s). Published by Elsevier Inc. This is an open access article under the CC BY-NC-ND license (http://creativecommons.org/licenses/by-nc-nd/4.0/). application/pdf
institution	Nanyang Technological University
building	NTU Library
continent	Asia
country	Singapore Singapore
content_provider	NTU Library
collection	DR-NTU
language	English
topic	Science::Mathematics Vector-Valued Differentiable Biseparating Maps
spellingShingle	Science::Mathematics Vector-Valued Differentiable Biseparating Maps Leung, Denny H. Ng, Hong Wai Tang, Wee Kee Banach-Stone Theorem for isometries on spaces of vector-valued differentiable functions
description	Let Q⊆Rm, K⊆Rn be open sets, p,q∈N, 1≤r<∞ and let E,F be Banach spaces. Denote by C⁎p(Q,E)r the space of all f∈Cp(Q,E) with bounded derivatives of order ≤p, endowed with the norm ‖f‖=sups∈Q⁡‖[(‖∂λf(s)‖E)λ∈Λ]‖r, where ‖⋅‖r denotes the ℓr norm on RΛ, Λ={λ:\|λ\|≤p}. Let T:C⁎p(Q,E)r→C⁎q(K,F)r be a linear surjective isometry. Then m=n and p=q and there are a Cp-diffeomorphism τ:K→Q and Banach space isomorphisms V(t):E→F so that Tf(t)=V(t)f(τ(t)) if f∈C⁎p(Q,E),t∈K. The result holds in a more general setting. The proof establishes a direct link between isometries and biseparating maps.
author2	School of Physical and Mathematical Sciences
author_facet	School of Physical and Mathematical Sciences Leung, Denny H. Ng, Hong Wai Tang, Wee Kee
format	Article
author	Leung, Denny H. Ng, Hong Wai Tang, Wee Kee
author_sort	Leung, Denny H.
title	Banach-Stone Theorem for isometries on spaces of vector-valued differentiable functions
title_short	Banach-Stone Theorem for isometries on spaces of vector-valued differentiable functions
title_full	Banach-Stone Theorem for isometries on spaces of vector-valued differentiable functions
title_fullStr	Banach-Stone Theorem for isometries on spaces of vector-valued differentiable functions
title_full_unstemmed	Banach-Stone Theorem for isometries on spaces of vector-valued differentiable functions
title_sort	banach-stone theorem for isometries on spaces of vector-valued differentiable functions
publishDate	2022
url	https://hdl.handle.net/10356/162444
_version_	1759858282614226944

Banach-Stone Theorem for isometries on spaces of vector-valued differentiable functions

Similar Items