UofT Libraries is getting a new library services platform in January 2021.

Learn more about the change.

## Search Articles

2017, Mathematical surveys and monographs, ISBN 9781470434687, Volume no. 223., xxi, 414 pages

Book

2009, De Gruyter studies in mathematics, ISBN 3110203200, Volume 35., xvi, 715

Book

2005, ISBN 9781860945755

Book

2008, 2nd, expanded edition., Lecture notes in mathematics, ISBN 9781402069185, Volume 1693., xiv, 244

Book

Abstract and applied analysis, ISSN 1085-3375, 12/2014, Volume 2014, pp. 1 - 9

Banach-Saks type is calculated for two types of Banach sequence spaces and Gurariǐ...

Physical Sciences | Mathematics | Mathematics, Applied | Science & Technology | Analysis | Banach spaces

Physical Sciences | Mathematics | Mathematics, Applied | Science & Technology | Analysis | Banach spaces

Journal Article

Journal of mathematical analysis and applications, ISSN 0022-247X, 09/2018, Volume 465, Issue 2, pp. 814 - 824

In this paper, we mainly investigate the local theory of integral Banach mapping spaces...

Integral injectivity | Integral Banach mapping space | Integral local reflexivity | Integral exactness | Integral nuclearity | Physical Sciences | Mathematics | Mathematics, Applied | Science & Technology

Integral injectivity | Integral Banach mapping space | Integral local reflexivity | Integral exactness | Integral nuclearity | Physical Sciences | Mathematics | Mathematics, Applied | Science & Technology

Journal Article

01/2005, ISBN 9781860945755

Book

2010, 2nd enlarged ed., Series on multivariate analysis, ISBN 9814282480, Volume 8, xii, 412

Book

Studia mathematica, ISSN 0039-3223, 2011, Volume 202, Issue 2, pp. 191 - 203

We study Banach spaces with directionally asymptotically controlled ellipsoid-approximations of the unit ball in finite-dimensional sections...

Norm geometry | Minimum volume ellipsoids | Local theory | Convexity of the duality mapping | Asymptotic theory | Banach spaces | Mazur's problem | Characterization of hilbert spaces | Physical Sciences | Mathematics | Science & Technology

Norm geometry | Minimum volume ellipsoids | Local theory | Convexity of the duality mapping | Asymptotic theory | Banach spaces | Mazur's problem | Characterization of hilbert spaces | Physical Sciences | Mathematics | Science & Technology

Journal Article

Indagationes mathematicae, ISSN 0019-3577, 04/2018, Volume 29, Issue 2, pp. 535 - 547

We generalize results concerning C0-semigroups on Banach lattices to a setting of ordered Banach spaces...

Disjointness preserving operator | [formula omitted]-semigroup | Ordered Banach space | Pre-Riesz space | Local operator | Regular norm | semigroup

Disjointness preserving operator | [formula omitted]-semigroup | Ordered Banach space | Pre-Riesz space | Local operator | Regular norm | semigroup

Journal Article

2004, ISBN 9812389377, x, 388

Book

14.
Full Text
On the complexity of the uniform homeomorphism relation between separable Banach spaces

Transactions of the American Mathematical Society, ISSN 0002-9947, 06/2011, Volume 363, Issue 6, pp. 3071 - 3099

We investigate the uniform homeomorphism relation between separable Banach spaces and the related relation of local equivalence...

Equivalence relation | Descriptive set theory | Real numbers | Homeomorphism | Separable spaces | Mathematical relations | Topology | Banach space | Topological spaces | Analytic equivalence relations | Uniform homeomorphism | Local equivalence | Borel reducibility | Physical Sciences | Mathematics | Science & Technology

Equivalence relation | Descriptive set theory | Real numbers | Homeomorphism | Separable spaces | Mathematical relations | Topology | Banach space | Topological spaces | Analytic equivalence relations | Uniform homeomorphism | Local equivalence | Borel reducibility | Physical Sciences | Mathematics | Science & Technology

Journal Article

01/2019, ISBN 3039216678

...: Biology, Chemistry, Economics, Physics, Scientific Computing and also Engineering can be formulated as an equation defined in abstract spaces using Mathematical Modelling...

local convergence | iterative methods | Lipschitz condition | divided difference | Traub | Multiple roots | semi-local convergence | scalar equations | left Bregman asymptotically nonexpansive mapping | basin of attraction | maximal monotone operator | general means | local and semilocal convergence | Steffensen’s method | derivative-free method | simple roots | fixed point problem | Nondifferentiable operator | Order of convergence | convergence order | Steffensen method | fast algorithms | split variational inclusion problem | weighted-Newton method | ball radius of convergence | Newton’s method | fractional derivative | Banach space | iterative method | computational convergence order | generalized mixed equilibrium problem | nonlinear equations | multiple-root solvers | uniformly convex and uniformly smooth Banach space | Newton | Fréchet-derivative | optimal convergence | systems of nonlinear equations | Optimal iterative methods | basins of attraction | Chebyshev’s iterative method | nonlinear equation | HSS method

local convergence | iterative methods | Lipschitz condition | divided difference | Traub | Multiple roots | semi-local convergence | scalar equations | left Bregman asymptotically nonexpansive mapping | basin of attraction | maximal monotone operator | general means | local and semilocal convergence | Steffensen’s method | derivative-free method | simple roots | fixed point problem | Nondifferentiable operator | Order of convergence | convergence order | Steffensen method | fast algorithms | split variational inclusion problem | weighted-Newton method | ball radius of convergence | Newton’s method | fractional derivative | Banach space | iterative method | computational convergence order | generalized mixed equilibrium problem | nonlinear equations | multiple-root solvers | uniformly convex and uniformly smooth Banach space | Newton | Fréchet-derivative | optimal convergence | systems of nonlinear equations | Optimal iterative methods | basins of attraction | Chebyshev’s iterative method | nonlinear equation | HSS method

eBook

2006, ISBN 9789812565570, xiii, 344

Book

International journal of wavelets, multiresolution and information processing, ISSN 0219-6913, 05/2016, Volume 14, Issue 3

In this paper, the concept of a family of local atoms in a Banach space is introduced by using a semi-inner product (s.i.p...

reproducing kernel Banach space | perturbation | sampling | semi-inner product | atomic system | K-frame | atom | family of local X | K-frame operator | Mathematics, Interdisciplinary Applications | Physical Sciences | Technology | Computer Science | Mathematics | Computer Science, Software Engineering | Science & Technology | Mathematics - Functional Analysis

reproducing kernel Banach space | perturbation | sampling | semi-inner product | atomic system | K-frame | atom | family of local X | K-frame operator | Mathematics, Interdisciplinary Applications | Physical Sciences | Technology | Computer Science | Mathematics | Computer Science, Software Engineering | Science & Technology | Mathematics - Functional Analysis

Journal Article

1978, Memoirs of the American Mathematical Society, ISBN 0821822071, Volume no. 207., vii, 53

Book

Mathematics (Basel), ISSN 2227-7390, 01/2020, Volume 8, Issue 1, p. 127

Let ( Ω , Σ , μ ) be a finite measure space and consider a Banach function space Y ( μ...

Physical Sciences | Mathematics | Science & Technology | concavification | pth power | local theory | banach space | banach function space | strongly p-integral operator

Physical Sciences | Mathematics | Science & Technology | concavification | pth power | local theory | banach space | banach function space | strongly p-integral operator

Journal Article

Journal of Fourier Analysis and Applications, ISSN 1069-5869, 4/2019, Volume 25, Issue 2, pp. 299 - 320

We prove that for every Banach space Y, the Besov spaces of functions from the n-dimensional Euclidean space to Y agree with suitable local approximation spaces with equivalent norms...

60G46 | Martingale cotype | Uniformly convex space | Littlewood–Paley theory | 46B20 | Embedding | Mathematics | Besov space | Abstract Harmonic Analysis | Primary 46E35 | Mathematical Methods in Physics | Fourier Analysis | 42B25 | Signal,Image and Speech Processing | Secondary 41A10 | Approximations and Expansions | Partial Differential Equations | Local approximation space | Physical Sciences | Mathematics, Applied | Science & Technology | Functions (mathematics) | Euclidean geometry | Approximation | Function space | Sobolev space | Norms | Banach space | Equivalence | Mathematical analysis | Euclidean space | Polynomials | Convexity | Martingales | Mathematics - Functional Analysis

60G46 | Martingale cotype | Uniformly convex space | Littlewood–Paley theory | 46B20 | Embedding | Mathematics | Besov space | Abstract Harmonic Analysis | Primary 46E35 | Mathematical Methods in Physics | Fourier Analysis | 42B25 | Signal,Image and Speech Processing | Secondary 41A10 | Approximations and Expansions | Partial Differential Equations | Local approximation space | Physical Sciences | Mathematics, Applied | Science & Technology | Functions (mathematics) | Euclidean geometry | Approximation | Function space | Sobolev space | Norms | Banach space | Equivalence | Mathematical analysis | Euclidean space | Polynomials | Convexity | Martingales | Mathematics - Functional Analysis

Journal Article

No results were found for your search.

Cannot display more than 1000 results, please narrow the terms of your search.