7 results on '"Mei-Chu Chang"'
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2. On the size of $k$-fold sum and product sets of integers
- Author
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Mei-Chu Chang and Jean Bourgain
- Subjects
Discrete mathematics ,Mathematics::Combinatorics ,Conjecture ,Mathematics - Number Theory ,Applied Mathematics ,General Mathematics ,Combinatorics ,Integer ,FOS: Mathematics ,Mathematics - Combinatorics ,11P70 ,Combinatorics (math.CO) ,Number Theory (math.NT) ,Finite set ,Mathematics - Abstract
We prove the following theorem: for all positive integers $b$ there exists a positive integer $k$, such that for every finite set $A$ of integers with cardinality $|A| > 1$, we have either $$ |A + ... + A| \geq |A|^b$$ or $$ |A \cdot ... \cdot A| \geq |A|^b$$ where $A + ... + A$ and $A \cdot ... \cdot A$ are the collections of $k$-fold sums and products of elements of $A$ respectively. This is progress towards a conjecture of Erd��s and Szemer��di on sum and product sets., 33 pages, no figures, submitted, J. Amer. Math. Soc. (Proxy submission)
- Published
- 2003
3. Some combinatorics of binomial coefficients and the Bloch-Gieseker property for some homogeneous bundles
- Author
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Mei-Chu Chang
- Subjects
Combinatorics ,Property (philosophy) ,Chern class ,Homogeneous ,Applied Mathematics ,General Mathematics ,Bundle ,Vector bundle ,Rational function ,Binomial coefficient ,Mathematics - Abstract
A vector bundle has the Bloch-Gieseker property if all its Chern classes are numerically positive. In this paper we show that the non-ample bundle Ω p Pn (p+1) has the Bloch-Gieseker property, except for two cases, in which the top Chern classes are trivial and the other Chern classes are positive. Our method is to reduce the problem to showing, e.g. the positivity of the coefficient of t k in the rational function (1+t) (n/p) (1+3t) (n/p-2) …(1+(p-1)t) (n/2) (1+(p+1)t)/(1+2t) (n/p-1) (1+4t) (n/p-3) …(1+pt) (n/1) (for p even).
- Published
- 2001
4. Inequidimensionality of Hilbert schemes
- Author
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Mei-Chu Chang
- Subjects
Hilbert manifold ,Applied Mathematics ,General Mathematics ,Mathematical analysis ,Codimension ,Equidimensional ,Moduli space ,Combinatorics ,Mathematics::Algebraic Geometry ,Hyperplane ,Hilbert scheme ,Bounded function ,Projective space ,Mathematics - Abstract
We give a lower bound on the number of distinct dimensions of irreducible components of the Hilbert scheme of codimension 2 subvarieties in P1W, for n < 5 (respectively, the moduli space of surfaces or 3-folds) in terms of the Hilbert polynomial (resp. Chern numbers). Let Hilbp be the Hilbert scheme of subvarieties in the projective space with fixed Hilbert polynomial P (respectively, let M be a moduli space of varieties with fixed Chern numbers). It is known that Hilbp (resp. M) has finitely many irreducible components and that the number of these components is bounded by some function of the Hilbert polynomial (resp. the Chern numbers). For work on the number of components of the Hilbert scheme (resp. the moduli space), see [EHM] for curves in P3 and [Chl] for codimension 2 subvarieties in Ipn with n ?5 (resp. [Cal], [Ca2], [Ca3], [M] for surfaces and [Chl] for surfaces and 3-folds). The next question to ask is whether the Hilbert scheme (resp. moduli space) is equidimensional if it is reducible. Catanese [Ca3] has shown that for M, the moduli space of surfaces, the number of distinct dimensions can be arbitrarily large. In this note we study the number of distinct dimensions of the components of the Hilbert scheme Hilbp (resp. moduli space M) parametrizing subschemes with intersection numbers H'Kn-2-i (resp. Chern numbers), where H is the hyperplane class and K is the canonical class. We define n(d, HK, K2) = #{dimHIH is a component of the Hilbert scheme of surfaces in JR'4 with intersection numbers d, HK, K2 }, n(d, H2K, HK2, K3) = #{dim HIH is a component of the Hilbert schemes of 3-folds in I5 with intersection numbers d, H2K, HK2, K3}, n(K2, C2) = #{dim HIH is a component of the moduli space of surfaces with Chern numbers K2, c21, n(K3,c1c2,c3) = #{dimHIH is a component of the moduli space of 3-folds with Chern numbers K3, C1 C2, C3 }. Received by the editors October 5, 1995 and, in revised form, March 14, 1996. 1991 Mathematics Subject Classification. Primary 14J29; Secondary 14M07, 14M12.
- Published
- 1997
5. Stable rank 2 reflexive sheaves on 𝑃³ with small 𝑐₂ and applications
- Author
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Mei-Chu Chang
- Subjects
Connection (fibred manifold) ,Discrete mathematics ,Pure mathematics ,Chern class ,Rank (linear algebra) ,Applied Mathematics ,General Mathematics ,Vector bundle ,Moduli ,Moduli space ,Mathematics::Algebraic Geometry ,Mathematics Subject Classification ,Hilbert scheme ,Mathematics - Abstract
We investigate the moduli spaces of stable rank two reflexive sheaves on P3 with small Chern classes. As an application to curves of low degree in P3, we prove the curve has maximal rank and that the corresponding Hilbert scheme is irreducible and unirational. Introduction. In the past few years, the subject of vector bundles on projective spaces and, in particular, the case of rank 2 on P3, has received much attention. Several basic theorems have been proved, e.g., the existence of the moduli space of stable vector bundles [M], though so far very few of these moduli spaces have been studied in detail. The interest of vector bundles partly stems from their connection with curves. However, the class of curves obtained in this way is rather restricted. Recently, Hartshorne [SRS] has focused attention on reflexive sheaves of rank 2 on P3. On the one hand, most results proved for vector bundles also turn out to be true for reflexive sheaves. On the other hand, reflexive sheaves have two significant advantages. First, they correspond to quite general curves; second, and most importantly, one has the "reduction step" introduced by Hartshorne, which is an effective tool in studying vector bundles, by relating them to simpler reflexive sheaves. In this paper, we investigate the moduli spaces of stable rank 2 reflexive sheaves on P3 with c2 3. For c2 < 2, we prove the moduli spaces are irreducible, nonsingular and rational; we also classify the related unstable planes. For c2= 3, in most cases we show that the moduli space is irreducible and unirational. As one of the applications to curves of low degree in P3 (cf. [SRS, 4.1]), we prove that the curve has maximal rank and that the corresponding Hilbert scheme is irreducible and unirational. Hence, as a corollary, we conclude that the variety of moduli '1g of curves of genus g is unirational, for g = 5, 6, 7, 8. In ?1, we give facts on multiple lines and deduce a criterion for unstable planes. ?2 contains our classification of semistable sheaves with c2 < 2. ?3 is about sheaves with c2 = 3. ?4 gives the applications to curves. ACKNOWLEDGMENT. I would like to thank my thesis advisor Robin Hartshorne. He has been very generous in his advice and time. In addition, he attracted to Received by the editors September 1, 1982 and, in revised form, March 18, 1983. 1980 Mathematics Subject Classification. Primary 14F05; Secondary 14D22. I1984 American Mathematical Society 0002-9947/84 $1.00 + $.25 per page
- Published
- 1984
6. Buchsbaum subvarieties of codimension 2 in 𝐏ⁿ
- Author
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Mei-Chu Chang
- Subjects
Pure mathematics ,Applied Mathematics ,General Mathematics ,Mathematical analysis ,Codimension ,Mathematics - Published
- 1988
7. Orbits of polynomial dynamical systems modulo primes
- Author
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Martín Sombra, Carlos D'Andrea, Mei-Chu Chang, Igor E. Shparlinski, Alina Ostafe, and Universitat de Barcelona
- Subjects
Reduction (recursion theory) ,General Mathematics ,Modulo ,Orbits ,Dynamical Systems (math.DS) ,01 natural sciences ,Upper and lower bounds ,Set (abstract data type) ,Combinatorics ,0103 physical sciences ,FOS: Mathematics ,Complex dynamical systems ,Number Theory (math.NT) ,0101 mathematics ,Mathematics - Dynamical Systems ,Finite set ,Mathematics ,Parametric statistics ,Discrete mathematics ,Mathematics - Number Theory ,Applied Mathematics ,010102 general mathematics ,Sistemes dinàmics complexos ,Orbit (dynamics) ,010307 mathematical physics ,Polynomial dynamical systems ,Òrbites - Abstract
We present lower bounds for the orbit length of reduction modulo primes of parametric polynomial dynamical systems defined over the integers, under a suitable hypothesis on its set of preperiodic points over C \mathbb {C} . Applying recent results of Baker and DeMarco (2011) and of Ghioca, Krieger, Nguyen and Ye (2017), we obtain explicit families of parametric polynomials and initial points such that the reductions modulo primes have long orbits, for all but a finite number of values of the parameters. This generalizes a previous lower bound due to Chang (2015). As a by-product, we also slightly improve a result of Silverman (2008) and recover a result of Akbary and Ghioca (2009) as special extreme cases of our estimates.
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