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Communications in Algebra Volume 32, 2004 - Issue 10
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Original Articles

Verification of the Connectedness of Space Curve Invariants for a Special Case

Mutsumi Amasaki Graduate School of Education, Hiroshima University, Higashi-Hiroshima, Japan; Graduate School of Education, Hiroshima University, 1-1-1, Kagamiyama, Higashi-Hiroshima, 739-8524, JapanCorrespondence[email protected]
Pages 3739-3744 | Received 01 Apr 2003, Published online: 24 Jun 2011

References

  • Amasaki , M. 1983 . Preparatory structure theorem for ideals defining space curves . Publ. RIMS , 19 : 493 – 518 .
  • Amasaki , M. 1985 . Examples of nonsingular irreducible curves which give reducible singular points of red(H d, g ) . Publ. RIMS , 21 : 761 – 786 .
  • Amasaki , M. 1990 . Application of the generalized Weierstrass preparation theorem to the study of homogeneous ideals . Trans. AMS , 317 : 1 – 43 .
  • Amasaki , M. 2000 . Generic Gröbner bases and Weierstrass bases of homogeneous submodules of graded free modules . J. Pure Appl. Algebra , 152 : 3 – 16 .
  • Amasaki , M. Inequalities satisfied by the basic sequence of an integral curve in P 3. Preprint. November, 2002
  • Cook , M. 1998 . The connectedness of space curves invariants . Compositio Math. , 111 : 221 – 244 .
  • Decker , W. and Schreyer , F.-O. 2000 . Non-general type surfaces in P 4: Some remarks on bounds and constructions . J. Symb. Comp. , 29 : 545 – 583 .
  • Urabe , T. 1979 . On Hironaka's monoideal . Publ. RIMS , 15 : 279 – 287 .
  • #Communicated by S. Goto.

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