Young diagrams and determinantal varieties

The Göttingen State and University Library provides access to digitized documents strictly for noncommercial educational, research and private purposes and makes no warranty with regard to their use for other purposes. Some of our collections are protected by copyright. Publication and/or broadcast in any form (including electronic) requires prior written permission from the Goettingen State-and University Library. Each copy of any part of this document must contain there Terms and Conditions. With the usage of the library's online system to access or download a digitized document you accept there Terms and Conditions. Reproductions of material on the web site may not be made for or donated to other repositories, nor may be further reproduced without written permission from the Goettingen State-and University Library For reproduction requests and permissions, please contact us. If citing materials, please give proper attribution of the source.

[1]  Jacques Deruyts Essai d'une théorie générale des formes algébriques , 1890 .

[2]  Alfredo Capelli Lezioni sulla teoria delle forme algebriche , 1902 .

[3]  Alfred Young On Quantitative Substitutional Analysis , 1930 .

[4]  H. Weyl The Classical Groups , 1939 .

[5]  W. V. D. Hodge,et al.  Some Enumerative Results in the Theory of Forms , 1943, Mathematical Proceedings of the Cambridge Philosophical Society.

[6]  J. Igusa ON THE ARITHMETIC NORMALITY OF THE GRASSMANN VARIETY. , 1954, Proceedings of the National Academy of Sciences of the United States of America.

[7]  D. Buchsbaum,et al.  Commutative Algebra, Vol. II. , 1959 .

[8]  M. Gerstenhaber ON DOMINANCE AND VARIETIES OF COMMUTING MATRICES , 1961 .

[9]  Melvin Hochster,et al.  Invariant theory and the generic perfection of determinantal loci , 1971 .

[10]  M. Hochster Criteria for equality of ordinary and symbolic powers of primes , 1973 .

[11]  G. Kempf,et al.  On the Geometry of a Theorem of Riemann , 1973 .

[12]  M. Hochster Grassmannians and their Schubert subvarieties are arithmetically Cohen-Macaulay , 1973 .

[13]  Gian-Carlo Rota,et al.  On the Foundations of Combinatorial Theory: IX Combinatorial Methods in Invariant Theory , 1974 .

[14]  Claudio Procesi,et al.  A characteristic free approach to invariant theory , 1976 .

[15]  Jacob Towber,et al.  Two new functors from modules to algebras , 1977 .

[16]  C. S. Seshadri,et al.  Geometry of G/P-II [The work of De Concini and Procesi and the basic conjectures] , 1978 .

[17]  Joseph P. S. Kung,et al.  Invariant theory, Young bitableaux, and combinatorics , 1978 .

[18]  D. Eisenbud,et al.  A Nullstellensatz with nilpotents and Zariski's Main Lemma on holomorphic functions , 1979 .

[19]  C. Concini Symplectic standard tableaux , 1979 .

[20]  On the symbolic powers of determinantal ideals , 1979 .

[21]  C. Musili,et al.  Geometry of $G/P$ , 1979 .

[22]  A. D. Fra,et al.  Young Diagrams and Ideals of Pfaffians , 1980 .

[23]  Peter Schenzel,et al.  Bemerkungen über Normale Flachheit und Normale Torsionsfreiheit und Anwendungen , 1981 .