@misc{grigoriev_study_of_2014, author={Grigoriev, S.V.,Altynbayev, E.V.,Eckerlebe, H.,Okorokov, A.I.}, title={Study of spin-wave dynamics in Fe65Ni35 ferromagnetic via small-angle polarized-neutron scattering}, year={2014}, howpublished = {journal article}, doi = {https://doi.org/10.1134/S1027451014050292}, abstract = {The results of studying the spin dynamics of a classical Fe65Ni35 invar alloy are presented and analyzed. The investigations are performed via small-angle polarized-neutron scattering in the oblique geometry of a magnetic field at various temperatures (T < T C). This approach is based on the analysis of left-right asymmetry in the magnetic scattering of polarized neutrons. The asymmetry effect arises when the magnetization direction of a sample is inclined with respect to the wave vector of the incident beam. The spin-wave scattering is concentrated within a range bounded by the cutoff angle θc determined by the magnetic field: θ c 2 (H) = θ 0 2 −(gμB H)θ0/E, where θ0=ℏ212Dmn , H is the external magnetic field, E is the initial neutron energy, D is the spin-wave stiffness constant, and m n is the neutron mass. The scattering is blurred by spinwave damping in the vicinity of the cutoff angle. The spin-wave stiffness constant can be obtained from a comparison of the asymmetric contribution to scattering and a model function. The temperature dependence D = D(T) is well defined by the expression D = D 0 |τ| x , where τ=1−TTC , x = 0.47 ± 0.01, D 0 = 137 ± 3 meVÅ2, and τ > 0.1 in the entire temperature range. The given method enables us to construct the temperature dependence of the spin-wave stiffness constant with a high accuracy and a small step.}, note = {Online available at: \url{https://doi.org/10.1134/S1027451014050292} (DOI). Grigoriev, S.; Altynbayev, E.; Eckerlebe, H.; Okorokov, A.: Study of spin-wave dynamics in Fe65Ni35 ferromagnetic via small-angle polarized-neutron scattering. Journal of Surface Investigation: X-ray, Synchrotron and Neutron Techniques. 2014. vol. 8, no. 5, 1027-1034. DOI: 10.1134/S1027451014050292}}