Titlebook: Analysis and Geometry; MIMS-GGTM, Tunis, Tu Ali Baklouti,Aziz El Kacimi,Nordine Mir Conference proceedings 2015 Springer International Publ

Intermediary

书目名称Analysis and Geometry影响因子(影响力)




书目名称Analysis and Geometry影响因子(影响力)学科排名




书目名称Analysis and Geometry网络公开度




书目名称Analysis and Geometry网络公开度学科排名




书目名称Analysis and Geometry被引频次




书目名称Analysis and Geometry被引频次学科排名




书目名称Analysis and Geometry年度引用




书目名称Analysis and Geometry年度引用学科排名




书目名称Analysis and Geometry读者反馈




书目名称Analysis and Geometry读者反馈学科排名

懦夫

2194-1009 ize winners in the fields of complex geometry, algebraic geometry and analysis. The book offers a valuable resource for all researchers interested in recent developments in analysis and geometry..978-3-319-36885-6978-3-319-17443-3Series ISSN 2194-1009 Series E-ISSN 2194-1017

drusen

沉思的鱼

Quasicrystals and Control Theory,rounded on a theorem on trigonometric sums proved by Arne Beurling. This will be our first example. The second example goes the other way around. A problem on trigonometric sums is solved using tools from control theory. Frontiers are erased as Baouendi wished.

牲畜栏

混杂人

Digital Receiver/Exciter Design,tisfies a strong general type condition that is related to a certain jet semistability property of the tangent bundle .. We then give a sufficient criterion for the Kobayashi hyperbolicity of an arbitrary directed variety (., .).

tic-douloureux

https://doi.org/10.1007/978-1-4471-5267-5 Hartogs triangle that . does not have closed range for (0, 1)-forms smooth up to the boundary, even though it has closed range in the weak . sense. An example is given to show that . might not have closed range in . on a Stein domain in complex manifold.

溃烂

Towards the Green-Griffiths-Lang Conjecture,tisfies a strong general type condition that is related to a certain jet semistability property of the tangent bundle .. We then give a sufficient criterion for the Kobayashi hyperbolicity of an arbitrary directed variety (., .).

灰心丧气

Non-closed Range Property for the Cauchy-Riemann Operator, Hartogs triangle that . does not have closed range for (0, 1)-forms smooth up to the boundary, even though it has closed range in the weak . sense. An example is given to show that . might not have closed range in . on a Stein domain in complex manifold.

合唱团

Conference proceedings 2015d away in 2011. All research articles were written by leading experts, some of whom are prize winners in the fields of complex geometry, algebraic geometry and analysis. The book offers a valuable resource for all researchers interested in recent developments in analysis and geometry..