437 research outputs found
Assessment of knee extension muscle strength and thickness to indirectly measure function-related parameters
Anosov Diffeomorphisms and γ -Tilings
We consider a toral Anosov automorphism G γ : T γ → T γ given by G γ (x, y) = (ax+ y, x) in the base, where a∈ N\ { 1 } , γ= 1 / (a+ 1 / (a+ 1 / …)) , v= (γ, 1) and w= (- 1 , γ) in the canonical base of R 2 and T γ = R 2 / (vZ× wZ). We introduce the notion of γ-tilings to prove the existence of a one-to-one correspondence between (i) marked smooth conjugacy classes of Anosov diffeomorphisms, with invariant measures absolutely continuous with respect to the Lebesgue measure, that are in the isotopy class of G γ ; (ii) affine classes of γ-tilings; and (iii) γ-solenoid functions. Solenoid functions provide a parametrization of the infinite dimensional space of the mathematical objects described in these equivalences.info:eu-repo/semantics/publishedVersio
Tilings and Anosov diffeomorphisms
A. Pinto and D. Sullivan [4] proved a one-to-one correspondence between: (i)
C1+ conjugacy classes of expanding circle maps; (ii) solenoid functions and (iii)
Pinto-Sullivan’s dyadic tilings on the real line.
A. Pinto [1,3] introduced the notion of golden tilings and proved a one-to-one correspondence
between (i) smooth conjugacy classes of Anosov diffeomorphisms,
with an invariant measure absolutely continuous with respect to the Lebesgue
measure, that are topologically conjugate to the linear automorphism G(x; y) =
(x + y; x), (ii) affine classes of golden tilings and (iii) solenoid functions.
Here we extend this last result and we exhibit a natural one-to-one correspondence
between (i) smooth conjugacy classes of Anosov diffeomorphisms, with an
invariant measure absolutely continuous with respect to the Lebesgue measure,
that are topologically conjugate to the linear automorphism G(x; y) = (ax+y; ax),
where a 2 N, (ii) affine classes of tilings in the real line and (iii) solenoid functions.
The solenoid functions give a parametrization of the infinite dimensional space
consisting of the mathematical objects described in the above equivalences
Golden tilings
In this talk we present the definition of a golden sequence {ri}i2N. These
golden sequences have the property of being Fibonacci quasi-periodic and determine
a tiling in the real line. We prove a one-to-one correspondence between:
(i) affine classes of golden tilings;
(ii) smooth conjugacy classes of Anosov difeomorphisms, with an invariant
measure absolutely continuous with respect to the Lebesgue measure, that
are topologically conjugate to the Anosov automorphis
Kierkegaard e a vida "conforme a conceção corrente de lógica" (Hegel)
A partir da mais clara afirmação de Kierkegaard acerca do absurdo, trata-se de explicar
as relações entre lógica corrente, Sócrates, a noção (filosófica) de mediação e lógica
hegeliana no pensamento de Kierkegaard.Starting from Kierkegaards most explicit statement about the absurd, I try to explain the relations, in Kierkegaards thought, between traditional logic, Socrates, the (philosophical) notion of mediation and Hegelian logic
Golden tilings
A. Pinto and D. Sullivan [3] proved a one-to-one correspondence between: (i)
Cl+ conjugacy classes of expanding circle maps; (ii) solenoid functions and (iii)
Pinto-Sullivan's dyadic tilings on the real line. Here, we prove a one-to-one correspondence
between: (i) golden tilings; (ii) smooth conjugacy classes of golden
diffeomorphism of the circle that are fixed points of renormalization; (iii) smooth
conjugacy classes of Anosov difeomorphisms, with an invariant measure absolutely
continuous with respect to the Lebesgue measure, that are topologically conjugated
to the Anosov automorphism G(x, y) = (x + y, x) and (iv) solenoid functions
Ladrilhamentos dourados da recta real
Apresentaremos a definição de sucessão dourada {r_i}. Estas sucessões possuem
a propriedade de serem Fibonacci quasi-periodicas e determinam um ladrilhamento
na recta real. Provaremos uma correspondência bijectiva entre:
(i) sucessões douradas;
(ii) Classes de conjugação diferenciáveis de difeomorfismos de Anosov na
classe de conjugação topológica do automorfismo hiperbólico do toro
G(x,y) =(x+y,x);
(iii) Classes de conjugação diferenciáveis de difeomorfismos da circunferência
com número de rotação igual ao inverso do número de ouro e que são pontos fixos do operador renormalização
Renormalization of circle diffeomorphism sequences and markov sequences
We show a one-to-one correspondence between circle diffeomorphism sequences that are C^{ 1+n}-periodic points of renormalization and smooth Markov sequences.We thank the financial support of LIAAD–INESC TEC through program PEst, USP-UP project, Faculty of Sciences, University of Porto, Calouste Gulbenkian Foundation, FEDER and COMPETE Programmes, PTDC/MAT/121107/2010 and Fundação para a Ciência e a Tecnologia (FCT). J. P.Almeida acknowledges the FCT support given through Grant SFRH/PROTEC/49754/2009
R&D dynamics with asymmetric efficiency
We consider an R&D investment function in a Cournot duopoly competition model inspired in the logistic equation. We study the economical effects resulting from the firms having different R&D efficiencies. We present three cases: (1) both firms are efficient and have the same degree of efficiency; (2) both firms are less efficient and have the same degree of efficiency; (3) firms are asymmetric in terms of the efficiency of their R&D investment programs. We study the myopic dynamics on the production costs obtained from investing the Nash investment equilibria.info:eu-repo/semantics/publishedVersio
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