Equations of negative curves of blow-ups of Ehrhart rings of rational convex polygons

Finite generation of the symbolic Rees ring of a space monomial prime ideal of a 3-dimensional weighted polynomial ring is a very interesting problem. Negative curves play important roles in finite generation of these rings. We are interested in the structure of the negative curve. We shall prove that negative curves are rational in many cases. We also see that the Cox ring of the blow-up of a toric variety at the point (1, 1, . . . , 1) coincides with the extended symbolic Rees ring of an ideal of a polynomial ring. For example, Roberts’ second counterexample to Cowsik’s question (and Hilbert’s 14th problem) coincides with the Cox ring of some normal projective variety (Remark 2.7).

[1]  H. Srinivasan On finite generation of symbolic algebras of monomial primes , 1991 .

[2]  G. G. Stokes "J." , 1890, The New Yale Book of Quotations.

[3]  Jürgen Herzog,et al.  Generators and relations of abelian semigroups and semigroup rings , 1970 .

[4]  S. Goto,et al.  Topics on symbolic Rees algebras for space monomial curves , 1991, Nagoya Mathematical Journal.

[5]  Mauricio Velasco,et al.  Big rational surfaces , 2009, 0901.1094.

[6]  Jos'e Luis Gonz'alez,et al.  Some non-finitely generated Cox rings , 2014, Compositio Mathematica.

[7]  C. Huneke Hilbert functions and symbolic powers. , 1987 .

[8]  Naoyuki Matsuoka,et al.  On finite generation of symbolic Rees rings of space monomial curves and existence of negative curves , 2008, 0801.3896.

[9]  Koji Nishida,et al.  Finitely generated symbolic Rees rings of ideals defining certain finite sets of points in P^2 , 2020, 2008.07761.

[10]  P. Roberts An infinitely generated symbolic blow-up in a power series ring and a new counterexample to Hilbert's fourteenth problem , 1990 .

[11]  S. Goto The Cohen-Macaulay symbolic Rees algebras for curve singularities , 1994 .

[12]  Kei-ichi Watanabe,et al.  NON-COHEN-MACAULAY SYMBOLIC BLOWUPS FOR SPACE MONOMIAL CURVES AND COUNTEREXAMPLES TO COWSIK ' S , 2010 .

[13]  Jos'e Luis Gonz'alez,et al.  Constructing non-Mori Dream Spaces from negative curves , 2018, Journal of Algebra.

[14]  後藤 四郎 Non-Cohen-Macaulay symbolic blow-ups for space monomial curves and counterexamples to Cowsik's question(The ring theory of blow-up rings) , 1992 .

[15]  日比 孝之,et al.  Algebraic combinatorics on convex polytopes , 1992 .

[16]  S. Cutkosky Symbolic algebras of monomial primes. , 1991 .

[17]  David A. Cox The homogeneous coordinate ring of a toric variety , 2013 .

[18]  S. Goto Non-Cohen-Macaulay symbolic blow-ups for space monomial curves and counterexamples to Cowsik's question(The ring theory of blow-up rings) , 1992 .

[19]  Kazuhiko Kurano,et al.  Asymptotic regularity of powers of ideals of points in a weighted projective plane , 2009, 0910.4232.

[20]  Kazuhiko Kurano,et al.  Infinitely Generated Symbolic Rees Rings of Space Monomial Curves Having Negative Curves , 2017, The Michigan mathematical journal.

[21]  Shinnosuke Okawa On images of Mori dream spaces , 2011, 1104.1326.

[22]  M. Morales Noetherian Symbolic Blow-Ups , 1991 .