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Twenty-Two Papers on Algebra, Number Theory and Differential Geometry
About this Title
M. S. Calenko, G. V. Dorofeev, I. M. Gel′fand, M. S. Gel′fand, M. I. Graev, Ku Chao-hao, L. D. Kudrjavcev, V. A. Kurbatov, G. V. Laptev, Ju. V. Linnik, L. A. Ljusternik, Ju. I. Manin, I. R. Šafarevič, V. I. Šneĭdmjuller, V. A. Toponogov and Wang Yuan
Publication: American Mathematical Society Translations: Series 2
Publication Year:
1964; Volume 37
ISBNs: 978-0-8218-1737-7 (print); 978-1-4704-3248-5 (online)
DOI: https://doi.org/10.1090/trans2/037
Table of Contents
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Front/Back Matter
Articles
- V. A. Kurbatov – Generalizations of Schur’s theorem concerning a class of algebraic functions
- V. A. Kurbatov – On equations of prime degree
- V. A. Kurbatov – Linear dependence of conjugate elements
- I. M. Gel′fand – Spherical functions on symmetric Riemannian spaces
- I. M. Gel′fand – Segments in a Dedekind lattice
- L. A. Ljusternik – Solution of problems of linear algebra by the method of continued fractions
- Ju. I. Manin – Algebraic curves over fields with differentiation
- G. V. Dorofeev – An example of a solvable but nonnilpotent alternative ring
- I. R. Šafarevič – Principal homogeneous spaces defined over a function field
- V. I. Šneĭdmjuller – On rings satisfying the minimal condition for subrings
- M. S. Calenko – Regular unions and special subdirect sums in catagories
- Wang Yuan – A note on some properties of the number-theoretic functions $\phi (n),$ $\sigma (n)$, and $d(n)$
- Ju. V. Linnik – All large numbers are sums of a prime and two squares (a problem of Hardy and Littlewood) I
- Ju. V. Linnik – All large numbers are sums of a prime and two squares (a problem of Hardy and Littlewood) II
- Ku Chao-Hao – On the imbedding problem in spaces of paths
- Ku Chao-Hao – Embedding of Finsler manifolds in a Minkowski space
- L. D. Kudrjavcev – On properties of differentiable mappings of regions of Euclidean spaces
- V. A. Toponogov – A property of convexity of Riemannian manifolds of positive curvature
- V. A. Toponogov – Riemannian spaces which contain straight lines
- V. A. Toponogov – Riemannian spaces having their curvature bounded below by a positive number
- G. F. Laptev – A group-theoretic method of differential geometric investigation
- I. M. Gel′fand and M. I. Graev – Geometry of homogeneous spaces, representations of groups in homogeneous spaces and related questions of integral geometry. I