Pseudo-integrable billiards and arithmetic dynamics
... vertex of an reflex angle, are called regular trajectories. Billiards in domains bounded by several confocal quadrics, without singular points where tangents form a reflex angle, were already studied by the authors: their periodic trajectories are described in [DR2004, DR2006a] while their topologic ...
... vertex of an reflex angle, are called regular trajectories. Billiards in domains bounded by several confocal quadrics, without singular points where tangents form a reflex angle, were already studied by the authors: their periodic trajectories are described in [DR2004, DR2006a] while their topologic ...
A Few Remarks on Bounded Operators on Topological Vector Spaces
... This completes the claim. In what follows, by using the concept of the projective tensor product of locally convex spaces, we are going to show that these concepts of bounded bilinear mappings are, in fact, the different types of bounded operators defined on a locally convex topological vector space ...
... This completes the claim. In what follows, by using the concept of the projective tensor product of locally convex spaces, we are going to show that these concepts of bounded bilinear mappings are, in fact, the different types of bounded operators defined on a locally convex topological vector space ...
SOLUTIONS TO EXERCISES FOR MATHEMATICS 205A — Part 2 II
... whose limit is (0, y); the terms of this sequence lie in the set F for all y ≥ n, and therefore the y-axis lies in L(F ). Therefore the closure is at least as large as the set we have described. To prove that it is no larger, we need to show that there are no limit points of F such that x 6= 0 and y ...
... whose limit is (0, y); the terms of this sequence lie in the set F for all y ≥ n, and therefore the y-axis lies in L(F ). Therefore the closure is at least as large as the set we have described. To prove that it is no larger, we need to show that there are no limit points of F such that x 6= 0 and y ...
Alexandroff and Ig-Alexandroff ideal topological spaces
... Alexandroff spaces were first studied by Alexandroff [2]. It is a topological space in which arbitrary intersection of open sets is open. Equivalently, each singleton has a minimal neighborhood base. Alexandroff spaces have important attentions because of their use in digital topology [10], [14]. In ...
... Alexandroff spaces were first studied by Alexandroff [2]. It is a topological space in which arbitrary intersection of open sets is open. Equivalently, each singleton has a minimal neighborhood base. Alexandroff spaces have important attentions because of their use in digital topology [10], [14]. In ...
Combinatorial formulas connected to diagonal
... write recommendation letters for me. I would also like to thank the faculty of the mathematics department for providing such a stimulating environment to study. I owe many thanks to the department secretaries, Janet, Monica, Paula and Robin. I was only able to finish the program with their professio ...
... write recommendation letters for me. I would also like to thank the faculty of the mathematics department for providing such a stimulating environment to study. I owe many thanks to the department secretaries, Janet, Monica, Paula and Robin. I was only able to finish the program with their professio ...
Full text
... An examination of all n* ^ 2 and all n ^ 10 6 found no other non-unitary subperfect numbers, so we are willing to risk the following: Conjecture 3- An integer n is non-unitary subperfect if and only if n = 18 or n = p 2 , where p is prime. It is possible to define non-unitary harmonic numbers by req ...
... An examination of all n* ^ 2 and all n ^ 10 6 found no other non-unitary subperfect numbers, so we are willing to risk the following: Conjecture 3- An integer n is non-unitary subperfect if and only if n = 18 or n = p 2 , where p is prime. It is possible to define non-unitary harmonic numbers by req ...
![arXiv:math/0201251v1 [math.DS] 25 Jan 2002](http://s1.studyres.com/store/data/014913155_1-788f445ae3a0c155aa768d6df676e28b-300x300.png)
Brouwer fixed-point theorem
Brouwer's fixed-point theorem is a fixed-point theorem in topology, named after Luitzen Brouwer. It states that for any continuous function f mapping a compact convex set into itself there is a point x0 such that f(x0) = x0. The simplest forms of Brouwer's theorem are for continuous functions f from a closed interval I in the real numbers to itself or from a closed disk D to itself. A more general form than the latter is for continuous functions from a convex compact subset K of Euclidean space to itself.Among hundreds of fixed-point theorems, Brouwer's is particularly well known, due in part to its use across numerous fields of mathematics.In its original field, this result is one of the key theorems characterizing the topology of Euclidean spaces, along with the Jordan curve theorem, the hairy ball theorem and the Borsuk–Ulam theorem.This gives it a place among the fundamental theorems of topology. The theorem is also used for proving deep results about differential equations and is covered in most introductory courses on differential geometry.It appears in unlikely fields such as game theory. In economics, Brouwer's fixed-point theorem and its extension, the Kakutani fixed-point theorem, play a central role in the proof of existence of general equilibrium in market economies as developed in the 1950s by economics Nobel prize winners Kenneth Arrow and Gérard Debreu.The theorem was first studied in view of work on differential equations by the French mathematicians around Poincaré and Picard.Proving results such as the Poincaré–Bendixson theorem requires the use of topological methods.This work at the end of the 19th century opened into several successive versions of the theorem. The general case was first proved in 1910 by Jacques Hadamard and by Luitzen Egbertus Jan Brouwer.