Problem 4. Let be an integer and set
Problem 1. Let be a continuous and decreasing real valued function defined on . Prove that
When do we have equality?
Problem 2. a) Prove that for every matrix there exists a matrix such that .
b) Prove that there exists a matrix such that for all .
Problem 3. Let be idempotent matrices () in . Prove that
where and is the set of matrices with real entries.
Problem 4. Let be an integer and set
Some hints follow.
First of all, FreeFem is a numerical computing software which allows a fast and automatized treatment of a variety of problems related to partial differential equations. Its name, FreeFem, speaks for itself: it is free and it uses the finite element method. Here are a few reasons for which you may choose to use FreeFem for a certain task:
- It allows the user to easily define 2D (and 3D) geometries and it does all the work regarding the construction of meshes on these domains.
- The problems you want to solve can be easily written in the program once we know their weak forms.
- Once we have variables defined on meshes or solutions to some PDE, we can easily compute all sorts of quantities like integral energies, etc.
Before showing a first example, you need to install FreeFem. If you are not familiar with command line work or you just want to get to work, like me, you can install the visual version of FreeFem which is available here. Of course, you can find example programs in the FreeFem manual or by making a brief search on the internet.
I’ll present some basic stuff, which will allow us in the end to solve the Laplace equation in a circular domain. Once we have the structure of the program, it is possible to change the shape of the domain in no time.
The emergence of 3D printers opens a whole new level of creation possibilities. Any computer generated model could be materialized as soon as it can be transformed in a language that the 3D printer can use. This is also the case with objects and structures which emerge from various mathematical research topics. Since I’m working on shape optimization problems I have lots of structures that would look nice printed in 3D. Below you can see an example of a 3D model and its physical realization by a 3D printer.
I want to show below how can you can turn a Matlab coloured patch into a file which can be used by a 3D printer. The first step is to export the Matlab information regarding the position of the points, the face structure and the colours into an obj file format. This is not at all complicated. Vertex information is stored on a line of the form
where is exactly the character , give the coordinates of the points and give the colour associated to the point in the RGB format. The face information can be entered in a similar fashion:
where are the indices of the points in the corresponding face. Once such an obj file is created, it can be imported in MeshLab (a free mesh editing software). Once you’re in MeshLab you should be able to export the structure into any file format you want, which can be understood by a 3D printer (like STL). Once you have the stl file, you can go on a 3D printing website like Sculpteo and just order your 3D object.
Problem 1. Let be a subset of the closed unit sphere in such that a dense system of chords of the unit sphere is disjoint from . Prove that there exists a closed subset of the unit sphere such that a chord connecting any two points of is disjoint from .
Problem 2. Let be a van der Jorput series, that is, if the binary representation of the positive integer is , then . Let be the set of points on the plane of the form . Let be the graph with vertex set that is connecting any two points if and only if there is a rectangle which lies in a parallel position to the axes and . Prove tha tthe chromatic number of is finite.
Problem 3. Let be a finite set and be a binary relation on it such that for any , if , and then either or (or possibly both). Let be minimal such that for any there exists such that either or (or possibly both). Supposing that has at most elements that are pairwise not in relation , prove that has at most elements.
Problem 4. Let be a series of positive integers with and for any arbitrary prime number the set is a complete remainder system modulo . Prove that .
Problem 5. We denote for an integer . For which are there polynomials with real coefficients and degrees smaller than such that .
Problem 6. Let be a permutation group on the finite set . Consider such that and for any there is a unique such that . Prove that if the elements of are conjugate in then is -transitive on .
Problem 7. We call a bar of width on the surface of the unit sphere centered at the origin a spherical segment which has width and is symmetric with respect to the origin. Prove that there exists a constant such that for any positive integer the surface can be covered with bars of the same width so that any point is contained in no more than bars.
Problem 8. Prove that all continuous solutions of the functional equation
are constant functions.
Problem 9. For a function defined on let us denote the neignborhood of unit raduis of the set of roots of . Prove that for any compact set there exists a constant such that if is an arbitrary real harmonic function on which vanishes in a point of then
Problem 10. Let be a continuously differentiable, strictly convex function. Let be a complex Hilbert space and be bounded, self adjoint linear operators on . Prove that if then . (not sure if this is right, since I can’t imagine what means)
Problem 11. For , where is composed of a finite number of closed intervals, we start a two dimensional Brownian motion from the point terminating when we first hit . Let be the probability of this finish point being in . Prove that is increasing on the interval .
Many thanks to Eles Andras for the translation. Solutions should not be discussed until the end of the competition: November the 2nd 2015.
Machines and computers represent numbers as sequences of zeros and ones called bits. The reason for doing this is the simplicity of constructing circuits dealing with two states. This fact coupled with limited memory capacities means that from the start we cannot represent all numbers in machine code. It is true that we can get as close as we want to any number with great memory cost when precision is important, but in fact we always use a fixed precision. In applications this precision is fixed to a number of bits (16, 32, 64) which correspond to significant digits in computations. Doing math operations to numbers represented on bits may lead to loss of information. Consider the following addition using significant digits:
notice that using only the first significant digits we have made an error of . This may seem small, but if we do not pay attention and we let errors of this kind accumulate we may have a final error which is unacceptable. This is what happened in the case of the Patriot missile case which I’ll discuss briefly below.
Continuing the SIAM 100-digit challenge presentation I show below how to solve the first problem of the series. A great bibliography for the series is the book entitled The SIAM 100-digit Challenge. A study in high-accuracy numerical computing by Folkmar Bornemann, Dirk Laurie, Stan Wagon, Jorg Waldvogel. The first problem in the series deals with the numerical integration of a highly oscillating function. As stated, the purpose is to obtain at least ten significant digits in the numerical computation.
Problem 1. Compute the limit