Magnetic Domain Structures of Electrodeposited Nickel-Iron Films
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概要
- 論文の詳細を見る
- 社団法人応用物理学会の論文
- 1965-08-15
著者
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Mukasa Koichi
Department Of Electronics Faculty Of Engineering Hokkaido University
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Mukasa Koichi
Department Of Electronic Engineering Faculty Of Engineering Hokkaido University
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MAEDA Masao
Department of Electronics, Faculty of Engineering, Hokkaido University
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Maeda Masao
Department Of Electronics Faculty Of Engineering Hokkaido University
関連論文
- Exchange Interaction between Magnetic Moments of Ferromagnetic Sample and Tip: Possibility of Atomic-Resolution Images of Exchange Interactions using Exchange Force Microscopy
- Hollow Crystal of Wurzite Type CdS
- Magnetic and Structural Properties of Electrodeposited Ni-S Films
- Possibility of Observing Spin-Polarized Tunneling Current Using Scanning Tunneling Microscope with Optically Pumped GaAs
- Effect of Average Stress in Films on Uniaxial Magnetic Anisotropy in Electrodeposited Nickel-Iron Thin Films
- Magnetic Domain Structures of Electrodeposited Nickel-Iron Films
- Preparatiorn of Oriented Large Domains of Diacetylene Monolayer at the Air-Water Interface
- Volume estimate of submanifolds in compact Riemannian manifolds
- Behavior of Thiourea Additive in the Electrodeposition Process of Iron Thin Film
- Magnetic and Structural Properties of Electrodeposited Co-Fe-S Alloys
- Chemical Polishing of CdS Single Crystal
- The Infrared Quenching of the Photo-Hall Effect of CdS:Cu
- A Note on the Geodesic Circles and Total Curvature
- The Injectivity Radius of Certain Manifolds
- The Integral of the Mean Curvature
- Compact Surfaces of Type 2
- Geodesic Sphere and Poles II
- On the Diameter of Geodesic Circles
- On the Eigenvalues of Laplacian
- Internal Stress of Electrodeposited Nickel-Iron Films
- On the Existence of the Rays
- Remarks on the Distribution of Rays
- Uniaxial Magnetic Anisotropy in Nickel-Iron Thin Films Electrodeposited on Scratched Surfaces
- A CERTAIN COMPACTNESS THEOREM
- A Note on the Pontrjagin Number of S^4
- The classification of compact surfaces by using Berger's Lemma