Letteratura scientifica selezionata sul tema "Semistable"
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Articoli di riviste sul tema "Semistable":
LI, LINGGUANG. "ON A CONJECTURE OF LAN–SHENG–ZUO ON SEMISTABLE HIGGS BUNDLES: RANK 3 CASE". International Journal of Mathematics 25, n. 02 (febbraio 2014): 1450013. http://dx.doi.org/10.1142/s0129167x1450013x.
Andreatta, Fabrizio, e Adrian Iovita. "Semistable Sheaves and Comparison Isomorphisms in the Semistable Case". Rendiconti del Seminario Matematico della Università di Padova 128 (2012): 131–285. http://dx.doi.org/10.4171/rsmup/128-7.
Mihalik, Michael L. "Bounded Depth Ascending HNN Extensions and -Semistability at infinity". Canadian Journal of Mathematics 72, n. 6 (22 luglio 2019): 1529–50. http://dx.doi.org/10.4153/s0008414x19000385.
Pancheva, E. "Max-semistable laws". Journal of Mathematical Sciences 76, n. 1 (agosto 1995): 2177–80. http://dx.doi.org/10.1007/bf02363231.
Hacking, Paul. "Semistable divisorial contractions". Journal of Algebra 278, n. 1 (agosto 2004): 173–86. http://dx.doi.org/10.1016/j.jalgebra.2004.03.008.
Bayer, Arend, Martí Lahoz, Emanuele Macrì, Howard Nuer, Alexander Perry e Paolo Stellari. "Stability conditions in families". Publications mathématiques de l'IHÉS 133, n. 1 (17 maggio 2021): 157–325. http://dx.doi.org/10.1007/s10240-021-00124-6.
Meerschaert, Mark M., e Hans-Peter Scheffler. "Series representation for semistable laws and their domains of semistable attraction". Journal of Theoretical Probability 9, n. 4 (ottobre 1996): 931–59. http://dx.doi.org/10.1007/bf02214258.
Rajput, Balram S., e Kavi Rama-Murthy. "Spectral representation of semistable processes, and semistable laws on Banach spaces". Journal of Multivariate Analysis 21, n. 1 (febbraio 1987): 139–57. http://dx.doi.org/10.1016/0047-259x(87)90103-5.
Shimizu, Koji. "A -adic monodromy theorem for de Rham local systems". Compositio Mathematica 158, n. 12 (dicembre 2022): 2157–205. http://dx.doi.org/10.1112/s0010437x2200776x.
Fujita, Kento. "On Berman–Gibbs stability and K-stability of -Fano varieties". Compositio Mathematica 152, n. 2 (26 novembre 2015): 288–98. http://dx.doi.org/10.1112/s0010437x1500768x.
Tesi sul tema "Semistable":
Kaid, Almar Alaa. "On semistable and strongly semistable syzygy bundles". Thesis, University of Sheffield, 2009. http://ethos.bl.uk/OrderDetails.do?uin=uk.bl.ethos.538073.
Zúñiga, Javier. "Semistable Graph Homology". Pontificia Universidad Católica del Perú, 2016. http://repositorio.pucp.edu.pe/index/handle/123456789/96300.
En este trabajo mediante la descomposicion orbicelular de la compacticacion de Deligne-Mumford del espacio de moduli de supercies de Riemann (estudiada antes por el autor) construimos un complejo basado en grafos de cinta semiestables, lo cual constituye una extension de la homologa de grafos de Kontsevich.
Derbyshire, Sam Luc. "Hodge numbers of semistable representations". Thesis, King's College London (University of London), 2017. https://kclpure.kcl.ac.uk/portal/en/theses/hodge-numbers-of-semistable-representations(9db3316a-0448-43f9-80c4-a2c0656ec177).html.
Pavel, Mihai-Cosmin. "Moduli spaces of semistable sheaves". Electronic Thesis or Diss., Université de Lorraine, 2022. http://www.theses.fr/2022LORR0125.
In this thesis we construct moduli spaces of semistable sheaves over a complex smooth projective variety X, endowed with a fixed polarization sheaf{O}_X(1). Our approach is based on ideas of Le Potier and Jun Li, who independently constructed moduli spaces of slope-semistable torsion-free sheaves over (projective) surfaces. Their spaces are closely related, via the Kobayashi-Hitchin correspondence, to the so-called Donaldson-Uhlenbeck compactification in gauge theory. Here, however, we are mainly interested in the algebraical aspects of their work. In a restrictive sense, this thesis generalizes their construction to higher dimensional pure sheaves, whose support scheme might be singular. First we introduce a notion of stability for pure coherent sheaves of dimension d on X, which lies between slope- and Gieseker-stability. This is defined with respect to the Hilbert polynomial of the sheaf, truncated down to a certain degree. We call it ell-(semi)stability, where ell marks the level of truncation. In particular, this recovers the classical notion of slope-stability for ell =1 and of Gieseker-stability for ell = d. Our construction uses as main ingredient a restriction theorem for (semi)stability, saying that the restriction of an ell-semistable (or ell-stable) sheaf to a general divisor D in |sheaf{O}_X(a)| of sufficiently large degree in X is again ell-semistable (respectively ell-stable). In this regard, in Chapter~ef{ch:RestrictionTheorems} we prove several restriction theorems for pure sheaves (see Theorems~ef{thm:GiesekerRestriction},ef{thm:restrictionStable} and ef{thm:ThmC}). The methods employed in the proofs permit us to give statements in arbitrary characteristic. Furthermore, our results generalize the restriction theorems of Mehta and Ramanathan for slope-(semi)stability, and they apply in particular to Gieseker-semistable sheaves. Before we give the construction, we take a short detour to generalize the classical Iitaka fibration to the equivariant setting. Given this, we construct projective moduli spaces of ell-semistable sheaves in higher dimensions as certain equivariant Iitaka fibrations (see Theorem~ef{thm:mainThm}). Our construction is new in the literature when 1
Vanumamalai, KarthikKalathi. "DEBRIS TRACKING IN A SEMISTABLE BACKGROUND". Master's thesis, University of Central Florida, 2005. http://digital.library.ucf.edu/cdm/ref/collection/ETD/id/2113.
M.S.E.E.
Department of Electrical and Computer Engineering
Engineering and Computer Science
Electrical Engineering
Xia, Bingyu. "Moduli spaces of Bridgeland semistable complexes". The Ohio State University, 2017. http://rave.ohiolink.edu/etdc/view?acc_num=osu1491824968521162.
Abe, Takeshi. "BOUNDEDNESS OF SEMISTABLE SHEAVES OF RANK FOUR". 京都大学 (Kyoto University), 2001. http://hdl.handle.net/2433/150404.
Coronica, Piero. "Semistable vector bundles on bubble tree surfaces". Thesis, Lille 1, 2015. http://www.theses.fr/2015LIL10064/document.
The (semi)stability, introduced by Mumford in 1963, was used for construction of moduli spaces of vector bundles by methods of GIT. In the boundary of the compactified moduli space appear non locally free sheaves. The thesis aims to propose a new stock of more manageable boundary objects, in the case of dimension 2 and rank 2, which are bundles on bubble trees A having S as root. Motivation comes from gauge theory and the study of bundles on reducible curves by Nagaraj-Seshadri and Teixidor i Bigas.The semistability on A depends on polarization, that is, on an ample line bundle. The domain of parameters of polarization is much smaller, and semistable bundles are more scarce in dimension 2 than in the case of curves. For certain polarizations, semistability criteria for bundles on A are given in terms of their restrictions to the components of A. Although the sheaves studied on A are bundles, their potentially destabilizing subsheaves can be just reflexive. Thence the classification of reflexive sheaves on bubble trees is undertaken, basing upon the work of Burban-Drozd. Next the deformations of tree-like bundles are studied. The main result is that a stable bundle on A, for certain polarizations, is always the limit of stable bundles on S. Finally, a comparison is made between the stock of stable tree-like bundles which are limits of instantons of charge 2 on the projective plane, and the one of Markushevich-Tikhomirov-Trautmann, obtained by a completely different approach
Di, Proietto Valentina. "On p-adic differential equations on semistable varieties". Doctoral thesis, Università degli studi di Padova, 2009. http://hdl.handle.net/11577/3426057.
Sia V un anello di valutazione completo di caratteristica mista (0,p), sia K il campo delle frazioni e k il campo residuo. In questa tesi vengono studiate le equazioni differenziale p-adiche su una varieta' semistabile su V. Consideriamo una varieta' X propria e semistabile su V e un divisore D a incroci normali relativi, Denotiamo con U l'aperto di X definito dal complementare di D e indichiamo con U_K e U_k ripettivamente la fibra generica e la fibra speciale di U. Allo stesso modo chiamiamo X_K, D_K e X_k, D_k la fibra generica e la fibra speciale di X, D. In questa situazione geometrica studiamo le relazioni tra le equazioni differenziali algebriche su X_K e le equazioni differenziali analitiche definite sullo spazio analitico rigido associato al completamento di X lungo la sua fibra speciale. Il risultato principale di questa tesi e' l'esistenza e la piena fedelta' di un funtore tra le seguenti categorie: 1) la categoria dei log isocristalli localmente liberi surconvergenti definiti sulla log coppia (U_k,X_k), (dove la log e' definita dal divisore dato dall'unione di X_k e D_k), con monodromia unipotente; 2) la categoria dei moduli a connessione su U_K, regolari lungo D_K, che ammettono un' estensione a moduli a connessione su X_K con residuo nilpotente.
Arzdorf, Kai [Verfasser]. "Semistable reduction of prime-cyclic Galois covers / Kai Arzdorf". Hannover : Technische Informationsbibliothek und Universitätsbibliothek Hannover (TIB), 2012. http://d-nb.info/1024917754/34.
Libri sul tema "Semistable":
Potashnik, Natasha. Derived Categories of Moduli Spaces of Semistable Pairs over Curves. [New York, N.Y.?]: [publisher not identified], 2016.
Belmans, Pieter, Wei Ho e Aise Johan de Jong, a cura di. Stacks Project Expository Collection. Cambridge University Press, 2022. http://dx.doi.org/10.1017/9781009051897.
Capitoli di libri sul tema "Semistable":
Maejima, Makoto. "Semistable Distributions". In Lévy Processes, 169–83. Boston, MA: Birkhäuser Boston, 2001. http://dx.doi.org/10.1007/978-1-4612-0197-7_8.
Balaji, V. "Semistable Principal Bundles". In Advances in Algebra and Geometry, 129–45. Gurgaon: Hindustan Book Agency, 2003. http://dx.doi.org/10.1007/978-93-86279-12-5_10.
McKay, John, e Abdellah Sebbar. "Arithmetic semistable elliptic surfaces". In CRM Proceedings and Lecture Notes, 119–30. Providence, Rhode Island: American Mathematical Society, 2001. http://dx.doi.org/10.1090/crmp/030/11.
Schmitt, Alexander H. W. "Generically Semistable Linear Quiver Sheaves". In Springer Proceedings in Mathematics & Statistics, 393–415. Cham: Springer International Publishing, 2017. http://dx.doi.org/10.1007/978-3-319-67053-9_38.
Bini, Gilberto, Fabio Felici, Margarida Melo e Filippo Viviani. "A Stratification of the Semistable Locus". In Lecture Notes in Mathematics, 117–30. Cham: Springer International Publishing, 2014. http://dx.doi.org/10.1007/978-3-319-11337-1_10.
Bini, Gilberto, Fabio Felici, Margarida Melo e Filippo Viviani. "Semistable, Polystable and Stable Points (Part I)". In Lecture Notes in Mathematics, 131–39. Cham: Springer International Publishing, 2014. http://dx.doi.org/10.1007/978-3-319-11337-1_11.
Bini, Gilberto, Fabio Felici, Margarida Melo e Filippo Viviani. "Semistable, Polystable and Stable Points (Part II)". In Lecture Notes in Mathematics, 149–54. Cham: Springer International Publishing, 2014. http://dx.doi.org/10.1007/978-3-319-11337-1_13.
Brumer, Armand, e Kenneth Kramer. "Semistable Abelian Varieties with Small Division Fields". In Galois Theory and Modular Forms, 13–37. Boston, MA: Springer US, 2004. http://dx.doi.org/10.1007/978-1-4613-0249-0_2.
Lávička, Roman. "Separation of Variables in the Semistable Range". In Trends in Mathematics, 395–403. Cham: Springer International Publishing, 2019. http://dx.doi.org/10.1007/978-3-030-23854-4_19.
Toda, Yukinobu. "Donaldson–Thomas Invariants for Bridgeland Semistable Objects". In SpringerBriefs in Mathematical Physics, 39–51. Singapore: Springer Singapore, 2021. http://dx.doi.org/10.1007/978-981-16-7838-7_4.
Atti di convegni sul tema "Semistable":
ABRAMOVICH, D., e J. M. ROJAS. "EXTENDING TRIANGULATIONS AND SEMISTABLE REDUCTION". In Proceedings of SMALEFEST 2000. WORLD SCIENTIFIC, 2002. http://dx.doi.org/10.1142/9789812778031_0001.
Ishizakiy, Takayuki, Henrik Sandberg, Karl Henrik Johansson, Kenji Kashima, Jun-ichi Imura e Kazuyuki Aihara. "Singular perturbation approximation of semistable linear systems". In 2013 European Control Conference (ECC). IEEE, 2013. http://dx.doi.org/10.23919/ecc.2013.6669434.
Ziemann, Ingvar, e Yishao Zhou. "Model Reduction of Semistable Distributed Parameter Systems". In 2019 18th European Control Conference (ECC). IEEE, 2019. http://dx.doi.org/10.23919/ecc.2019.8796051.
Qing Hui. "Optimal semistable control for continuous-time coupled systems". In 2010 American Control Conference (ACC 2010). IEEE, 2010. http://dx.doi.org/10.1109/acc.2010.5531476.
Haddad, Wassim M., Qing Hui e VijaySekhar Chellaboina. "H2 optimal semistable control for linear dynamical systems: An LMI approach". In 2007 46th IEEE Conference on Decision and Control. IEEE, 2007. http://dx.doi.org/10.1109/cdc.2007.4434337.
Hui, Qing, e Zhenyi Liu. "A semistabilizability/semidetectability approach to semistable H2 and H∞ control problems". In 2011 49th Annual Allerton Conference on Communication, Control, and Computing (Allerton). IEEE, 2011. http://dx.doi.org/10.1109/allerton.2011.6120217.
Qing Hui e Wassim M. Haddad. "H2 optimal semistable stabilization for linear discrete-time dynamical systems with applications to network consensus". In 2007 46th IEEE Conference on Decision and Control. IEEE, 2007. http://dx.doi.org/10.1109/cdc.2007.4434396.
Cheng, Xiaodong, e Jacquelien M. A. Scherpen. "A new controllability Gramian for semistable systems and its application to approximation of directed networks". In 2017 IEEE 56th Annual Conference on Decision and Control (CDC). IEEE, 2017. http://dx.doi.org/10.1109/cdc.2017.8264221.
Newcomb, R. W., C. Wooten e B. Dziurla. "Semistate equivalency: the Lewis realization". In 29th IEEE Conference on Decision and Control. IEEE, 1990. http://dx.doi.org/10.1109/cdc.1990.203545.
Syrmos, V. L., e F. L. Lewis. "Transmission Zero Assignment using Semistate Descriptions". In 1992 American Control Conference. IEEE, 1992. http://dx.doi.org/10.23919/acc.1992.4792183.