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Publicações

Também fornecemos uma lista de pré-publicações recentes, já submetidas para publicação.

Os asteriscos junto a cada entrada destinam-se a fornecer o endereço de uma hiperligação para essa entrada. Copie-a usando o botão direito do rato.

[*]: Abreu, M. and L. Macarini (2012). Contact homology of good toric contact manifolds. Compos. Math. 148, 304-334.

[*]: Abreu, M. and L. Macarini (2012). Remarks on Lagrangian intersections in toric manifolds. Trans. Amer. Math. Soc. To appear. arXiv:1105.0640.

[*]: Abreu, M. and R. Sena-Dias (2012). Kahler metrics on non-compact symplectic toric 4-manifolds. Ann. Global Anal. Geom. 41, 209-239.

[*]: Alves, J. and L. Silva (2012). Periodic paths on nonautonomous graphs. Linear Algebra Appl. To appear.

[*]: Alves, J. F. and M. Málek (2012). Zeta functions and topological entropy of periodic nonautonomous dynamical systems. Discrete Contin. Dyn. Syst. To appear.

[*]: Andersen, K., B. Oliver, and J. Ventura (2012). Reduced, tame and exotic fusion systems. Proc. London Math. Soc. (3) To appear. arXiv:1009.0622.

[*]: Baía, M., J. Matias, and P. M. Santos (2012). A relaxation result in framework of structured deformations in the BV setting. Proc. Roy. Soc. Edinburgh Sect. A To appear.

[*]: Baía, M., M. Chermisi, J. Matias, and P. Santos (2012). Lower semicontinuity and relaxation of signed functionals with linear growth in the context of A-quasiconvexity. Calc. Var. Partial Differential Equations to appear.

[*]: Bakker, L. and P. M. Rodrigues (2012). A profinite group invariant for hyperbolic toral automorphisms. Discrete Contin. Dyn. Syst. 32 (6), 1965-1976. arXiv:1102.0839.

[*]: Bardi, M. and G. Terrone (2012). On the Homogenization of some Non-coercive Hamilton-Jacobi-Isaacs Equations. Commun. Pure Appl. Anal. To appear.

[*]: Barreira, L. (2012). Ergodic Theory, Hyperbolic Dynamics and Dimension Theory. Universitext. Springer.

[*]: Barreira, L. and C. Valls (2012). Admissibility versus nonuniform exponential behavior for noninvertible cocycles. Discrete Contin. Dyn. Syst. To appear.

[*]: Barreira, L. and C. Valls (2012). Analytic robustness of parameter-dependent perturbations of difference equations. Topol. Methods Nonlinear Anal. To appear.

[*]: Barreira, L. and C. Valls (2012). Complex Analysis and Differential Equations. Undergraduate Mathematics Series. Springer.

[*]: Barreira, L. and C. Valls (2012). Conjugacies for impulsive equations. Proc. Edinb. Math. Soc. (2) 55, 65-78.

[*]: Barreira, L. and C. Valls (2012). Nonuniformly hyperbolic cocyles: adissibility and robustness. Ann. Sc. Norm. Super. Pisa Cl. Sci. (5) To appear.

[*]: Barreira, L. and C. Valls (2012). Ordinary Differential Equations: Qualitative Theory. Graduate Studies in Mathematics. American Mathematical Society.

[*]: Barreira, L. and C. Valls (2012). Sistemas Dinâmicos: uma Introdução. Colecção Ensino da Ciência e da Tecnologia 44, IST Press.

[*]: Barreira, L. and C. Valls (2012). Stable manifolds with optimal regularity for difference equations. Discrete Contin. Dyn. Syst. 32, 1537-1555.

[*]: Barreira, L., J. Llibre, and C. Valls (2012). Bifurcation of limit cycles from a $4$ -dimensional center in $R^{m}$ in resonance $1 : N$ . J. Math. Anal. Appl. To appear.

[*]: Barreira, L., M. Fan, C. Valls, and J. Zhang (2012). Parameter dependence of stable manifolds for delay equations with polinomial dichotomies. J. Dynam. Differential Equations 24, 101-118.

[*]: Boehm, J. and S. Papadakis (2012). Implementing the Kustin-Miller complex construction. J. Software Algebra Geometry To appear. arXiv:1103.2314.

[*]: Boehm, J. and S. Papadakis (2012). On the structure of Stanley-Reisner rings associated to cyclic polytopes. Osaka J. Math. To appear. arXiv:0912.2152.

[*]: Buss, G. and R. Leclercq (2012). Pseudo-distances on symplectomorphism groups and applications to flux theory. Math. Z. To appear. arXiv:1103.5144.

[*]: Cal, F. S., G. A. Dias, and J. H. Videman (2012). Existence of trapped modes in a periodic array of obstacles in a two-layer fluid. Quart. J. Mech. Appl. Math. To appear.

[*]: Casimiro, A. and C. Florentino (2012). Stability of Affine G-varieties and Irreducibility in Reductive Groups. Internat. J. Math. To appear. arXiv:1110.4236.

[*]: Casimiro, A. and C. Rodrigo (2012). First variation formula and conservation laws in several independent discrete variables. J. Geom. Phys. 62 (1), 61-86.

[*]: Casimiro, A. and C. Rodrigo (2012). First variation formula for discrete variational problems in two independent variables. Rev. R. Acad. Cienc. Exactas Fis. Nat. (Esp.) 106 (1), 111-135.

[*]: Chiadò Piat, V., S. A. Nazarov, and J. H. Videman (2012). Asymptotics of frequency of a surface wave trapped by a slightly inclined screen in a liquid layer. Zap. Nauchn. Sem. S.-Peterburg. Otdel. Mat. Inst. Steklov. (POMI) To appear.

[*]: Corcho, A. J., F. Oliveira, and J. D. Silva (2012). Local and Global Well-posedness for the Critical Schrodinger-Debye System. Proc. Amer. Math. Soc. To appear.

[*]: Costa, F. P., M. Grinfeld, M. Langer, N. J. Mottram, and J. T. Pinto (2012). Kickback in nematic liquid crystals. Quart. Appl. Math. 70, 99-110.

[*]: Costa, F., C. Herdeiro, J. Natário, and M. Zilhão (2012). Mathisson's helical motions for a spinning particle - are they unphysical? Phys. Rev. D (3) 85 (024001), 11pp.

[*]: Costa, F., M. Grinfeld, M. Lancer, N. Mottram, and J. Pinto (2012). Kickback in nematic liquid crystals. Quart. Appl. Math. LXX (1), 99-110.

[*]: Costakis, G. and I. Parissis (2012). Dynamics of Tuples of Matrics in Jordan Form. Oper. Matr. To appear.

[*]: Costakis, G. and I. Parissis (2012). Szemeredi's Theorem, Frequent Hypercyclicity and Multiple Recurrence. Math. Scand. To appear.

[*]: El Harti, R. and P. R. Pinto (2012). Group C*-algebras satisfying Kadison's conjecture. Banach Center Publ. To appear.

[*]: Esteves, J. N., M. Hirsch, W. Porod, J. C. Romão, F. Staub, and A. Vicente (2012). Dark matter and LHC phenomenology in a left-right supersymmetric model. J. High Energy Phys. 2012 (01:095). arXiv:1109.6478.

[*]: Evans, D. E. and P. R. Pinto (2012). Subfactor ralization of modular invariants: II. Internat. J. Math. 23 (3), 33pp.

[*]: Fernandes, R. and P. Frejlich (2012). A $h$ -principle for symplectic foliations. Int. Math. Res. Not. To appear. arXiv:1010.3447.

[*]: Fiedler, B., C. Rocha, and M. Wolfrum (2012). A permutation characterization of Sturm global attractors of Hamiltonian type. J. Differential Equations 252 (1), 588-623.

[*]: Gomes, D. A. and G. Terrone (2012). On the Bernstein estimate for systems of weakly coupled fully non-linear elliptic equations and integral operators. Commun. Pure Appl. Anal. To appear.

[*]: Gordon, C., W. Kirwin, D. Schueth, and D. Webb (2012). Classical Equivalence and Quantum Equivalence for Magnetic Fields on Flat Tori. Proc. Sympos. Pure Math. To appear. arXiv:1108.5113.

[*]: Guttenberg, S. (2012). A Projection to the Pure Spinor Space, Volume Strings, Gauge Fields, and the Geometry Behind - The Legacy of Maximilian Kreuzer. World Scientific Publishing.

[*]: Henriques, P. G. and J. Natário (2012). The rocket problem in general relativity . J. Optim. Theory Appl. To appear.

[*]: Hoyo, M. L. (2012). On the homotopy type of a cofibred category. Cah. Topol. Géom. Différ. Catég. To appear.

[*]: Hoyo, M. L. (2012). On the loop space of a 2-category. J. Pure Appl. Algebra 216, 28-40.

[*]: Khovanov, M., A. D. Lauda, M. Mackaay, and M. Stosic (2012). Extended graphical calculus for categorified quantum $sl (2)$ . Mem. Amer. Math. Soc. To appear. arXiv:1006.2866.

[*]: Lopes, P. and J. Matias (2012). Minimum Number of Fox Colors for Small Primes. J. Knot Theory Ramifications 21 (3), 1-12.

[*]: Lopez, H. H., E. Sarmiento, M. Vaz Pinto, and R. H. Villarreal (2012). Parameterized affine codes . Studia Sci. Math. Hungar. To appear. arXiv:1109.2353.

[*]: Mackaay, M., M. Stosic, and P. Vaz (2012). A diagrammatic categorification of the $q$ -Schur algebra. Quantum Topol. To appear. arXiv:1008.1348.

[*]: Martínez Torres, D. (2012). A note on strict $C$ -convexity. Rev. Mat. Complut. 25 (1), 125-137.

[*]: Martínez Torres, D. (2012). Non-linear symplectic Grassmannians and prequantum line bundles. Int. J. Geom. Methods Mod. Phys. 9 (1), 1-18.

[*]: Mendes Lopes, M. and R. Pardini (2012). A uniform bound on the canonical degree of albanese defective curves. Bull. London Math. Soc. To appear. arXiv:1103.4292.

[*]: Mendes Lopes, M., R. Pardini, and G. P. Pirola (2012). A characterization of the symmetric square of a curve. Int. Math. Res. Not. To appear. arXiv:1008.1790.

[*]: Mendes Lopes, M., R. Pardini, and G. P. Pirola (2012). On surfaces of general type with $q = 5$ . Ann. Sc. Norm. Super. Pisa Cl. Sci. (5) To appear. arXiv:1003.5991.

[*]: Monneau, R. and S. Patrizi (2012). Derivation of the Orowan's law for the Peierls-Nabarro model. Comm. Partial Differential Equations To appear.

[*]: Monneau, R. and S. Patrizi (2012). Homogenization of the Peierls-Nabarro model for dislocation dynamics. J. Differential Equations To appear.

[*]: Natário, J. (2012). Optimal time travel in the Gödel universe. Gen. Relativity Gravitation To appear.

[*]: Orantin, N. and A. Veliz-Osorio (2012). Non-homogenous disks in the chain of matrices. J. High Energy Phys. (080), 25pp. arXiv:1111.3777.

[*]: Pandharipande, R. (2012). Descendent bounds for effective divisors on the moduli space of curves. J. Algebraic Geom. 21, 299-303.

[*]: Papadakis, S. and B. V. Steirteghem (2012). Equivariant degenerations of spherical modules for groups of type $A$ . Ann. Inst. Fourier (Grenoble) To appear. arXiv:1008.0911.

[*]: Protin, M. C. and P. Resende (2012). Quantales of open groupoids. J. Noncommut. Geom. 6, 199-247.

[*]: Ravara, A., P. Resende, and V. Vasconcelos (2012). An algebra of behavioural types . Inform. and Comput. 212, 64-91.

[*]: Resende, P. (2012). Groupoid sheaves as quantale sheaves. J. Pure Appl. Algebra 216, 41-70.

[*]: Rocha, C. and B. Fiedler (2012). Sturm global attractors of Hamiltonian type for semilinear parabolic equations. Publ. Res. Inst. Math. Sci. To appear.

[*]: Sarmiento, E., M. Vaz Pinto, and R. H. Villarreal (2012). On the vanishing ideal of an algebraic toric set and its parameterized linear codes . J. Algebra Appl. To appear. arXiv:1107.4284.

[*]: Siconolfi, A. and G. Terrone (2012). A metric proof of the convers Lyapunov Theorem for semicontinuous dynamics. Discrete Contin. Dyn. Syst. To appear.

[*]: Teixeira, J. and M. J. Borges (2012). Existence of periodic solutions of ordinary differential equations. J. Math. Anal. Appl. 385, 414-422.

[*]: Thiel, A.-L. (2012). Virtual braid groups of type $B$ and weak categorification. J. Knot Theory Ramifications 21 (1250020), 21pp. arXiv:0912.3680.