Uniform convergence and pointwise convergence
The aim of this material is to introduce the student to two notions of convergence for sequences of real-valued functions. The notion of pointwise convergence is relatively straightforward, but the notion of uniform convergence is more subtle. Uniform convergence is explained in terms of closed function balls and the new notion of sets absorbing sequences. The differences between the two types of convergence are illustrated with several examples. Some standard facts are also discussed: a unif
Author(s): Feinstein Joel F. Dr

License information
Related content

Except for third party materials (materials owned by someone other than The University of Nottingham) and where otherwise indicated, the copyright in the content provided in this resource is owned by

The Future of Global Capitalism, Convergence or Divergence Across the World
This event brings together Martin Jacques, Professor Michael Cox, and Professor Robert Wade to debate the changing nature and form of modern capitalism and to explore some of the challenges that will confront capitalism in the years ahead. Martin Jacques is the author of When China Rules the World: the Rise of the Middle Kingdom and the End of the Western World, and a Senior Visiting Fellow at LSE IDEAS. Michael Cox is professor of international relations and co-director of LSE IDEAS. Robert Wad
Author(s): No creator set

License information
Related content

Bivariate Uniform Experiment
This resource consists of a Java applet and expository text. The Java applet illustrates the bivariate uniform distribution on three types of regions: a square, a circle, and a triangle. Simulated points from the distribution are shown as dots in a scatterplot.
Author(s): No creator set

License information
Related content

Drawing of Indian military uniform
Drawing of Indian military uniform
Author(s): No creator set

License information
Related content

3.4 Cylinders and shapes with a uniform cross-section
Geometry is concerned with the various aspects of size, shape and space. In this unit, you will explore the concepts of angles, shapes, symmetry, area and volume through interactive activities.
Author(s): The Open University

License information
Related content

Licensed under a Creative Commons Attribution - NonCommercial-ShareAlike 2.0 Licence - see http://creativecommons.org/licenses/by-nc-sa/2.0/uk/ - Original copyright The Open University

1.4.1 Describing uniform motion
Motion is vital to life, and to science. This unit will help you to understand why classical motion is probably the most fundamental part of physics. You will examine motion along a line and the ways in which such motion can be represented, through the use of graphs, equations and differential calculus.
Author(s): The Open University

License information
Related content

Except for third party materials and otherwise stated (see http://www.open.ac.uk/conditions terms and conditions), this content is made available under a http://creativecommons.org/licenses/by-nc-sa/2

1.4.4 The equations of uniform motion
Motion is vital to life, and to science. This unit will help you to understand why classical motion is probably the most fundamental part of physics. You will examine motion along a line and the ways in which such motion can be represented, through the use of graphs, equations and differential calculus.
Author(s): The Open University

License information
Related content

Except for third party materials and otherwise stated (see http://www.open.ac.uk/conditions terms and conditions), this content is made available under a http://creativecommons.org/licenses/by-nc-sa/2

Uniform Estimate Experiment
This resource consists of a Java applet and expository text. The applet simulates a random sample from the uniform distribution on the interval [0,a], and computes standard point estimates of a. The bias and mean square error are also computed.
Author(s): No creator set

License information
Related content

Uniform convergence and pointwise convergence
The aim of this material is to introduce the student to two notions of convergence for sequences of real-valued functions. The notion of pointwise convergence is relatively straightforward, but the notion of uniform convergence is more subtle. Uniform convergence is explained in terms of closed function balls and the new notion of sets absorbing sequences. The differences between the two types of convergence are illustrated with several examples. Some standard facts are also discussed: a unifo
Author(s): Creator not set

License information
Related content

Rights not set

2007.09.27-How Convergence Culture is Changing the Relations Between Producers and Consumers
This keynote lecture for the Frontiers of New Media Symposium addresses the changing landscape of media. As media converge and online communities begin to take an active role in the production of media content, Henry Jenkins explores the changing rel...
Author(s): No creator set

License information
Related content

The next wave of convergence - Ian Pearson
Futurologist Ian Pearson talks about the next wave of convergence between the digital and human.
Author(s): No creator set

License information
Related content

Vet's Uniform
Even well into the 20th century, the U.S. Army relied heavily on horses and mules to move equipment. But, surprisingly, veterinarians are a fairly recent addition to our military.
Author(s): No creator set

License information
Related content

Uniform Estimate Experiment
This resource consists of a Java applet and expository text. The applet simulates a random sample from the uniform distribution on the interval [0,a], and computes standard point estimates of a. The bias and mean square error are also computed.
Author(s): No creator set

License information
Related content

Bivariate Uniform Experiment
This resource consists of a Java applet and expository text. The Java applet illustrates the bivariate uniform distribution on three types of regions: a square, a circle, and a triangle. Simulated points from the distribution are shown as dots in a scatterplot.
Author(s): No creator set

License information
Related content

The Uniform Boundedness Principle - Dr Joel Feinstein
This is a lecture from Dr Feinstein's 4th-year module G14FUN Functional Analysis. See also Dr Feinstein's blog at http://explainingmaths.wordpress.com/ and, in particular, the Functional Analysis screencasts blog page at http://wp.me/PosHB-8v In this screencast, Dr Feinstein discusses two famous results concerning collections of bounded linear operators, one of which is a corollary of the other. Both of these results have been called the Banach-Steinhaus Theorem (by various authors). The stron
Author(s): No creator set

License information
Related content

Uniform convergence and pointwise convergence
The aim of this material is to introduce the student to two notions of convergence for sequences of real-valued functions. The notion of pointwise convergence is relatively straightforward, but the notion of uniform convergence is more subtle. Uniform convergence is explained in terms of closed function balls and the new notion of sets absorbing sequences. The differences between the two types of convergence are illustrated with several examples. Some standard facts are also discussed: a uniform
Author(s): No creator set

License information
Related content

3.4 Cylinders and shapes with a uniform cross-section
Geometry is concerned with the various aspects of size, shape and space. In this unit, you will explore the concepts of angles, shapes, symmetry, area and volume through interactive activities.
Author(s): The Open University

License information
Related content

Except for third party materials and otherwise stated (see http://www.open.ac.uk/conditions terms and conditions), this content is made available under a http://creativecommons.org/licenses/by-nc-sa/2

Alternating series test + absolute convergence
This is a basic lecture on how to apply the alternating series test (Leibniz test). We also discuss absolute convergence of series and how it is useful. Plenty of examples are presented to illustrate the ideas. Such concepts are seen in first year university mathematics.
Author(s): No creator set

License information
Related content

Problem Based Learning tasks in Economic Growth: convergence hypothesis theory
Student handout outlining a PBL (Problem Based Learning) task on a final year course on economic growth and understanding convergence hypothesis theory.
Author(s): Guglielmo Volpe

License information
Related content

http://creativecommons.org/licenses/by-nc/2.0/uk/

Uniform convergence and pointwise convergence
The aim of this material is to introduce the student to two notions of convergence for sequences of real-valued functions. The notion of pointwise convergence is relatively straightforward, but the notion of uniform convergence is more subtle. Uniform convergence is explained in terms of closed function balls and the new notion of sets absorbing sequences. The differences between the two types of convergence are illustrated with several examples. Some standard facts are also discussed: a uniform
Author(s): Feinstein Joel F. Dr

License information
Related content

http://creativecommons.org/licenses/by-nc-sa/2.0/uk/

Pages 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32