249,317 research outputs found

    Castillo, P. *2006. Book review: WOUTS, W.M. 2006. Criconematina (Nematoda: Tylenchida). Fauna of New Zealand 55, 232 pp. [ISBN 0-478- 09381-0]

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    Castillo, P. *2006. Book review: WOUTS, W.M. 2006. Criconematina (Nematoda: Tylenchida). Fauna of New Zealand 55, 232 pp. [ISBN 0-478- 09381-0]Castillo, P. *2006. Book review: WOUTS, W.M. 2006. Criconematina (Nematoda: Tylenchida). Fauna of New Zealand 55, 232 pp. [ISBN 0-478- 09381-0

    matthew-p-brown/E_cells_2023: E_cells_2024

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    <p>This page contains the code used to analyze behavior and voltage imaging data from <strong>Brown et al., 2024</strong>. Further questions can be sent to the corresponding author, Dr. Mark N. Wu ([email protected]).</p&gt

    Castillo de Chapultepec: Ciudad de México

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    La información de esta miniguía se basa en los trabajos de Rubén M. Campos y el proyecto de conservación arquitectónica del Museo Nacional de Historia.El Castillo de Chapultepec, sede del Museo Nacional de Historia, se encuentra ubicado en la prominencia natural más elevada del valle de México. El pasado conocido del cerro del Chapulín se remonta al siglo Xlll, cuando fue asentamiento de grupos nahuas que buscaron el control de manantiales de aguas dulces y limpias. Según la Tira de la Peregrinación, antes de fundar Tenochtitlán los mexicas se establecieron en este lugar, pero fueron expulsados. Desde finales del siglo XVl, los tlatoanis tenochcas consideraban a Chapultepec un importante lugar de culto religioso y de recreo: fueron construidos entonces un adoratorio en la parte alta del cerro y los famosos baños de Moctezuma en la falda.</p

    Conservative local discontinuous Galerkin methods for a generalized system of strongly coupled nonlinear Schrödinger equations

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    Mass and energy conservative numerical methods are proposed for a general system of N strongly coupled nonlinear Schrödinger equations (N-CNLS). Motivated by the structure preserving properties of composition methods, two basic conservative, first and second order time integrators, are developed as seed schemes for the derivation of high order conservative methods. To avoid solving a global nonlinear system, involving all the components of the vector field at each time step, a conservative nonlinear splitting method based on a modified Crank-Nicolson scheme is proposed. Conservation of the mass for each component and total energy is formally proved for the semi-discrete primal formulation of the Local Discontinuous Galerkin (LDG) method and for the fully discrete methods. Since the proposed splitting scheme is independent of the spatial discretization, conservation of the same invariants is also obtained for other symmetric discontinuous Galerkin discretizations. Conservation and accuracy of the discrete invariants; and, spatial and temporal convergence are numerically validated on a series of benchmark (2/3)-CNLS systems. Using a special projector operator, the approximated initial energy of the system is shown, numerically, to convergence with order O(h2p+2) when polynomials of degree p are used
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