Results 141 to 150 of about 3,448,082 (381)
[Elliptic Differential Equations] [PDF]
Reflection laws of systems of elliptic equations, on-line programming to numerically solve nonlinear integral equations, and reduction of electrostriction ...
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Non-Linear Elliptic Equations without Non-Linear Entire Solutions [PDF]
, 1954 Lipman Bers
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Spin‐Polarized Antiferromagnets for Spintronics
Advanced Materials, EarlyView.This review highlights recent advances in anomalous and spin transport phenomena in spin‐polarized antiferromagnets. Key effects—including the anomalous Hall, Nernst, and magneto‐optical effects—are discussed across various antiferromagnetic platforms.
Zhenzhou Guo +5 more
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Journal of Applied Mathematics, 2012 We modified the rational Jacobi elliptic functions method to construct some new exact solutions for nonlinear differential difference equations in mathematical physics via the lattice equation, the discrete nonlinear Schrodinger equation with a saturable
Khaled A. Gepreel +2 more
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On Classes of Solutions of Elliptic Linear Partial Differential Equations [PDF]
, 1957 Avner Friedman
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Advanced Materials, EarlyView.An octahedrally coordinated MnCl2N4 structure anchored on hard carbon tailors the electronic environment of single atoms to lower zinc nucleation barriers. Chloride‐assisted Zn adsorption with Jahn‐Teller distortion and residual Zn enables reduced overpotential.
Yibo Zhu +12 more
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Operatori ellittici massiminimanti
Le Matematiche, 1996 In the theory of second order elliptic equations, in non divergence form, two non linear elliptic operators, which are non convex with respect to the second derivatives, are studied.
Cristina Giannotti
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Continuous dependence of boundary values for semiinfinite interval ordinary differential equations
International Journal of Mathematics and Mathematical Sciences, 1986 Certain elliptic equations arising in catalysis theory can be transformed into ordinary differential equations on the interval (0,∞). The solutions to these problems usually depend on parameters ρ∈ℝn, say u(t,ρ).
David H. Eberly
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A solution of a simple functional equation as a basis for readily obtaining certain fundamental formulas in the theory of elliptic functions [PDF]
, 1930 G. W. Starcher
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On the nonlinear elliptic equations with symmetry
Journal of Mathematical Analysis and Applications, 1981 has a smooth solution with norm r in the appropriate function space. This theorem is based on an infinite-dimensional analogue of the following theorem of Borsuk: if D c R” is the unit disc in the euclidean space then for every odd mapping J D + Rk, k 1, then there is no G-equivariant mapf: S(v) + w\(O).
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