References
[Be] Beauville, A.: Fibrés de rang2 sur une courbe, fibré déterminant et fonctions theta. Preprint Orsay 1987
[Bh] Bhosle (Desale), U.N.: Moduli of orthogonal and spin bundles over hyperelliptic curves. Comp. Math.51, 15–40 (1984)
[Bo] Bott, R.: Homogeneous vector bundles. Ann. Math.66, 203–248 (1957)
[B-W] Brauer, R., Weyl, H.: spinors inn dimensions. Am. J. Math.57, 425–449 (1935)
[C] Coble, A.B.: Algebraic geometry and theta functions. New York: AMS Publication 1929
[D-R] Desale, U.V., Ramanan, S.: Classification of vector bundles of rank 2 on hyperelliptic curves. Invent. Math.38, 161–185 (1976)
[G-H] Griffiths, P., Harris, J.: Principles of algebraic geometry. New York: Wiley 1978
[I] Igusa, J.: Theta functions. (Grundlehren, 194) Berlin, Heidelberg, New York: Springer 1972
[J] Jacobson, N.: Basic algebra. I. San Francisco: Freeman 1974
[K] King, R.C.: The dimensions of irreducible tensor representations. Can. J. Math.23, 176–188 (1971)
[M 1] Mumford, D.: On the equations defining abelian varieties. Invent. Math.1, 287–354 (1966)
[M 2] Mumford, D.: Prym varieties. I. In: Contributions to analysis, pp. 325–350. London, New York: Academic Press 1974
[M 3] Mumford, D.: Tata lectures on theta. II. Boston, Basel: Birkhäuser 1984
[N-R] Narasimhan, M.S., Ramanan, S.:20 Linear systems on abelian varieties. Preprint Tata Institute
[S] Seshadri, C.S.: Geometry ofG/P-I. In: Ramanujan, C.P. (ed.). A tribute, pp. 207–239. Published for the Tata Institute. Berlin, Heidelberg, New York: Springer 1978
[W] Weyl, H.: The classical groups. Princeton: Princeton University Press 1946
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van Geemen, B. Schottky-Jung relations and vectorbundles on hyperelliptic curves. Math. Ann. 281, 431–449 (1988). https://doi.org/10.1007/BF01457155
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DOI: https://doi.org/10.1007/BF01457155