Publicado por Leipzig: B. G. Tuebner, 1932
Librería: Stony Hill Books, Madison, WI, Estados Unidos de America
Original o primera edición
Soft cover. Condición: Very Good. 1st Edition. Light gray-green printed wrappers 133 pages in German, page edges untrimmed.
Publicado por Chelsea Publishing Company, 1961
Librería: BookDepart, Shepherdstown, WV, Estados Unidos de America
Hardcover. Condición: UsedVery Good. Hardcover, Volume 2 only; light fading, light shelf wear to exterior; numbers written inside front cover; in very good condition with clean text, firm binding. No dust jacket. ASIN: B0007HFFRY.
Publicado por Chelsea Pub. Co, 1960
Librería: Browsers' Bookstore, CBA, Albany, OR, Estados Unidos de America
Miembro de asociación: CBA
hardcover. Condición: Very Good. A nice copy. Clean text, solid binding. Bound in maroon cloth with gilt lettering.
Publicado por Chelsea Publishing Company, 1961
Librería: Imaginal Books, Sardent, Francia
Original o primera edición
Hardcover. Condición: Very Good. No Jacket. 1st Edition. Volume Two of Introduction to Modern Algebra and Matrix Theory.
Publicado por Chelsea Publishing, New York, 1959
Librería: Leopolis, Kraków, Polonia
Hardcover. Condición: Very Good. 2 volumes 8vo (23.5 cm), VIII, 378, [14] pp; 208 pp. Publisher's cloth, gilt-lettered spines (numbers on the front free endpaper, canceled stamps of a mathematical institution verso of title pages). Second edition. Translated by Martin Davis and Melvin Hausner. Otto Schreier (1901-1929) was a Jewish-Austrian mathematician who made major contributions to combinatorial group theory and the topology of Lie groups. Emanuel Sperner (1905-1980) was a German mathematician, best known for two theorems in the set theory. Their renowned work, "Einführung in die Analytische Geometrie und Algebra," was originally published in 1931-35 in two volumes. This English translation includes both volumes, the final part of Volume I on projective geometry published as Volume 2. Chapter headings include: Volume I: I. Affine Space. Linear Equations. II. Euclidean Space. Theory of Determinants. III. The Theory of Fields. Fundamental Theorem of Algebra. IV. Elements of Group Theory. V. Matrices and Linear Transformations. Volume II: I. n-Dimentional Projective Space. II. General Projective Coordinates. III. Hyperplane Coordinates. The Duality Principle. IV. The Cross Ratio. V. Projectivities. VI. Linear Projectivities of Pn onto Itself. VII. Correlations. VIII. Hypersurfaces of the second Order. IX. Projective Classification of Hypersurfaces of the Second Order. X. Projective Properties of Hypersurfaces of the Second Order. XI. The Affine Classification of Hypersurfaces of the Second Order. XII. The Metric Classification of Hypersurfaces of the Second Order.