Liouville type theorems for generalized P-harmonic maps
Arabian Journal of MathematicsAbstractSome theorems of Liouville type are given for such P-harmonic maps when target manifold have conformal vector field or convex function or have non-positive sectional curvature.
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Dynamic analysis of the fractional distributed delay models. [PDF]
Sci RepEl-Saka HAA +2 more
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Existence Theorem for a Fractal Sturm-Liouville Problem [PDF]
In this article, using a new calculus defined on fractal subsets of the set of real numbers, a Sturm-Lioville type problem is discussed, namely the fractal Sturm-Liouville problem.
Allahverdiev, B. P., Tuna, H.
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Scalable modeling of multi-spin ensembles in SABRE hyperpolarization: a symmetry-based framework for zero and ultralow fields. [PDF]
Magn Reson (Gott)Markelov D +4 more
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Fixed-point topology meets fractal memory: a Kutumba-stabilized framework for nonlocal fractal-fractional dynamics. [PDF]
Sci RepDevi RA +6 more
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A theorem of Liouville's type for Meson equation
Proceedings of the Japan Academy, Series A, Mathematical Sciences, 1951 openaire +2 more sources
Analysis of delay differential equations with dual caputo-type fractional derivatives using laplace transform methods. [PDF]
Sci RepBoumaaza M +4 more
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, 2008 We prove higher-order Euler-Lagrange and DuBois-Reymond stationary conditions to fractional action-like variational problems.
Frederico, G.S.F., Torres, D.F.M.
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A fractional SEIVRB model for aquatic diseases dynamics with stability analysis and numerical solution. [PDF]
Sci RepKosari S +3 more
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GrĂ¼ss-type inequalities involving functional bounds via analytic kernel fractional integral. [PDF]
MethodsXNeamah MK +3 more
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