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You searched for subject:(poincare inequality). Showing records 1 – 7 of 7 total matches.

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Cornell University

1. Tasena, Santi. Heat Kernal Analysis On Weighted Dirichlet Spaces.

Degree: PhD, Mathematics, 2011, Cornell University

 This thesis is concerned with heat kernel estimates on weighted Dirichlet spaces. The Dirichlet forms considered here are strongly local and regular. They are defined… (more)

Subjects/Keywords: poincare inequality; doubling; remotely constant

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APA (6th Edition):

Tasena, S. (2011). Heat Kernal Analysis On Weighted Dirichlet Spaces. (Doctoral Dissertation). Cornell University. Retrieved from http://hdl.handle.net/1813/33627

Chicago Manual of Style (16th Edition):

Tasena, Santi. “Heat Kernal Analysis On Weighted Dirichlet Spaces.” 2011. Doctoral Dissertation, Cornell University. Accessed September 29, 2020. http://hdl.handle.net/1813/33627.

MLA Handbook (7th Edition):

Tasena, Santi. “Heat Kernal Analysis On Weighted Dirichlet Spaces.” 2011. Web. 29 Sep 2020.

Vancouver:

Tasena S. Heat Kernal Analysis On Weighted Dirichlet Spaces. [Internet] [Doctoral dissertation]. Cornell University; 2011. [cited 2020 Sep 29]. Available from: http://hdl.handle.net/1813/33627.

Council of Science Editors:

Tasena S. Heat Kernal Analysis On Weighted Dirichlet Spaces. [Doctoral Dissertation]. Cornell University; 2011. Available from: http://hdl.handle.net/1813/33627


University of Oxford

2. Wink, Matthias. Ricci solitons and geometric analysis.

Degree: PhD, 2018, University of Oxford

 This thesis studies Ricci solitons of cohomogeneity one and uniform Poincaré inequalities for differentials on Riemann surfaces. In the two summands case, which assumes that… (more)

Subjects/Keywords: 516.3; Mathematics; Differential Geometry; Einstein metric; Ricci soliton; Poincare inequality

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APA (6th Edition):

Wink, M. (2018). Ricci solitons and geometric analysis. (Doctoral Dissertation). University of Oxford. Retrieved from http://ora.ox.ac.uk/objects/uuid:3aae2c5e-58aa-42da-9a1b-ec15cacafdad ; https://ethos.bl.uk/OrderDetails.do?uin=uk.bl.ethos.748945

Chicago Manual of Style (16th Edition):

Wink, Matthias. “Ricci solitons and geometric analysis.” 2018. Doctoral Dissertation, University of Oxford. Accessed September 29, 2020. http://ora.ox.ac.uk/objects/uuid:3aae2c5e-58aa-42da-9a1b-ec15cacafdad ; https://ethos.bl.uk/OrderDetails.do?uin=uk.bl.ethos.748945.

MLA Handbook (7th Edition):

Wink, Matthias. “Ricci solitons and geometric analysis.” 2018. Web. 29 Sep 2020.

Vancouver:

Wink M. Ricci solitons and geometric analysis. [Internet] [Doctoral dissertation]. University of Oxford; 2018. [cited 2020 Sep 29]. Available from: http://ora.ox.ac.uk/objects/uuid:3aae2c5e-58aa-42da-9a1b-ec15cacafdad ; https://ethos.bl.uk/OrderDetails.do?uin=uk.bl.ethos.748945.

Council of Science Editors:

Wink M. Ricci solitons and geometric analysis. [Doctoral Dissertation]. University of Oxford; 2018. Available from: http://ora.ox.ac.uk/objects/uuid:3aae2c5e-58aa-42da-9a1b-ec15cacafdad ; https://ethos.bl.uk/OrderDetails.do?uin=uk.bl.ethos.748945

3. DeJarnette, Noel. Self improving Orlicz-Poincare inequalities.

Degree: PhD, 0439, 2014, University of Illinois – Urbana-Champaign

 In [20], Keith and Zhong prove that spaces admitting Poincar e inequalities also admit a priori stronger Poincar e inequalities. We use their technique, with… (more)

Subjects/Keywords: Orlicz Functions; Poincare inequality; maximal function operator

…Poincar´ e inequality for r > 1+ 5 2 , but does not admit a Γ2,q -Poincar´ e inequality for… …so that the double 1 C g(t) ≤ f (t) − A udµ = A udµ = inequality ≤ Cg… …the Poincar´ e inequality using upper gradients and continuous (measurable)… …any complete metric measure space that admits an Orlicz-Poincar´ e inequality is quasiconvex… …and Poincar´ e inequalities. Definition 2.5 (p-Poincar´ e inequality for Upper… 

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APA (6th Edition):

DeJarnette, N. (2014). Self improving Orlicz-Poincare inequalities. (Doctoral Dissertation). University of Illinois – Urbana-Champaign. Retrieved from http://hdl.handle.net/2142/46744

Chicago Manual of Style (16th Edition):

DeJarnette, Noel. “Self improving Orlicz-Poincare inequalities.” 2014. Doctoral Dissertation, University of Illinois – Urbana-Champaign. Accessed September 29, 2020. http://hdl.handle.net/2142/46744.

MLA Handbook (7th Edition):

DeJarnette, Noel. “Self improving Orlicz-Poincare inequalities.” 2014. Web. 29 Sep 2020.

Vancouver:

DeJarnette N. Self improving Orlicz-Poincare inequalities. [Internet] [Doctoral dissertation]. University of Illinois – Urbana-Champaign; 2014. [cited 2020 Sep 29]. Available from: http://hdl.handle.net/2142/46744.

Council of Science Editors:

DeJarnette N. Self improving Orlicz-Poincare inequalities. [Doctoral Dissertation]. University of Illinois – Urbana-Champaign; 2014. Available from: http://hdl.handle.net/2142/46744

4. Lopez, Marcos D. Discrete Approximations of Metric Measure Spaces with Controlled Geometry.

Degree: PhD, Arts and Sciences: Mathematical Sciences, 2015, University of Cincinnati

 The goal of this thesis is to study metric measure spaces equipped with a doublingmeasure and supporting a Poincare inequality, in terms of graph approximations.We… (more)

Subjects/Keywords: Mathematics; Gromov Hausdorff convergence; doubling condition; Poincare inequality; analysis on metric measure spaces

…metric measure spaces supporting a Poincaré inequality. The study of abstract first-order… …p)-Poincaré inequality if the average oscillation, or variance, of every function u… …of Poincaré inequality enjoys many useful properties such as connectedness, various… …space (X, dX , µ), verifying that it satisfies a Poincaré-type inequality is… …and supports a Poincaré-type inequality will be presented. This method will ensure that the… 

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APA (6th Edition):

Lopez, M. D. (2015). Discrete Approximations of Metric Measure Spaces with Controlled Geometry. (Doctoral Dissertation). University of Cincinnati. Retrieved from http://rave.ohiolink.edu/etdc/view?acc_num=ucin1439305529

Chicago Manual of Style (16th Edition):

Lopez, Marcos D. “Discrete Approximations of Metric Measure Spaces with Controlled Geometry.” 2015. Doctoral Dissertation, University of Cincinnati. Accessed September 29, 2020. http://rave.ohiolink.edu/etdc/view?acc_num=ucin1439305529.

MLA Handbook (7th Edition):

Lopez, Marcos D. “Discrete Approximations of Metric Measure Spaces with Controlled Geometry.” 2015. Web. 29 Sep 2020.

Vancouver:

Lopez MD. Discrete Approximations of Metric Measure Spaces with Controlled Geometry. [Internet] [Doctoral dissertation]. University of Cincinnati; 2015. [cited 2020 Sep 29]. Available from: http://rave.ohiolink.edu/etdc/view?acc_num=ucin1439305529.

Council of Science Editors:

Lopez MD. Discrete Approximations of Metric Measure Spaces with Controlled Geometry. [Doctoral Dissertation]. University of Cincinnati; 2015. Available from: http://rave.ohiolink.edu/etdc/view?acc_num=ucin1439305529


University of Michigan

5. Keith, Stephen John. A differentiable structure for metric measure spaces.

Degree: PhD, Pure Sciences, 2002, University of Michigan

 The main result of this dissertation is the provision of conditions, weaker than those of Cheeger [Che99], under which a metric measure space admits a… (more)

Subjects/Keywords: Differentiable Structure; Homogeneous Space; Homogeneous Spaces; Lipschitz Functions; Metric Measure Spaces; Poincare Inequality; Rademacher's Differentiability Theorem

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APA (6th Edition):

Keith, S. J. (2002). A differentiable structure for metric measure spaces. (Doctoral Dissertation). University of Michigan. Retrieved from http://hdl.handle.net/2027.42/129745

Chicago Manual of Style (16th Edition):

Keith, Stephen John. “A differentiable structure for metric measure spaces.” 2002. Doctoral Dissertation, University of Michigan. Accessed September 29, 2020. http://hdl.handle.net/2027.42/129745.

MLA Handbook (7th Edition):

Keith, Stephen John. “A differentiable structure for metric measure spaces.” 2002. Web. 29 Sep 2020.

Vancouver:

Keith SJ. A differentiable structure for metric measure spaces. [Internet] [Doctoral dissertation]. University of Michigan; 2002. [cited 2020 Sep 29]. Available from: http://hdl.handle.net/2027.42/129745.

Council of Science Editors:

Keith SJ. A differentiable structure for metric measure spaces. [Doctoral Dissertation]. University of Michigan; 2002. Available from: http://hdl.handle.net/2027.42/129745

6. Shartser, Leonid. De Rham Theory and Semialgebraic Geometry.

Degree: 2011, University of Toronto

This thesis consists of six chapters and deals with four topics related to De Rham Theory on semialgebraic sets. The first topic deals with L-infinity… (more)

Subjects/Keywords: Semialgebraic geometry; metric invariants; L^p cohomology; Poincare inequality for differential forms; 0405

…5.4 Global Lp inequality on a semialgebraic set . . . . . . . . . . . . . . . . . 99… …Lp inequality. . . . . . . . . . . . . . . . . . . . . . . . . . 105 6 Appendix 107 6.1… …Poincar´ e inequality for forms . . . . . . . . . . . . . . . . . . . . . 108 6.2.1 6.3… …Poincar´ e inequality on a convex set in Rn . . . . . . . . . . . . . . 108 Globalization of… …Poincar´ e type inequality for forms . . . . . . . . . . . . 113 6.3.1 6.3.2 Construction of… 

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APA (6th Edition):

Shartser, L. (2011). De Rham Theory and Semialgebraic Geometry. (Doctoral Dissertation). University of Toronto. Retrieved from http://hdl.handle.net/1807/29865

Chicago Manual of Style (16th Edition):

Shartser, Leonid. “De Rham Theory and Semialgebraic Geometry.” 2011. Doctoral Dissertation, University of Toronto. Accessed September 29, 2020. http://hdl.handle.net/1807/29865.

MLA Handbook (7th Edition):

Shartser, Leonid. “De Rham Theory and Semialgebraic Geometry.” 2011. Web. 29 Sep 2020.

Vancouver:

Shartser L. De Rham Theory and Semialgebraic Geometry. [Internet] [Doctoral dissertation]. University of Toronto; 2011. [cited 2020 Sep 29]. Available from: http://hdl.handle.net/1807/29865.

Council of Science Editors:

Shartser L. De Rham Theory and Semialgebraic Geometry. [Doctoral Dissertation]. University of Toronto; 2011. Available from: http://hdl.handle.net/1807/29865

7. Li, Xining. Preservation of bounded geometry under transformations metric spaces.

Degree: PhD, Arts and Sciences: Mathematical Sciences, 2015, University of Cincinnati

 In the theory of geometric analysis on metric measure spaces, two properties of a metric measure space make the theory richer. These two properties are… (more)

Subjects/Keywords: Mathematics; Quasiconvexity and annular quasiconvexity; Upper gradient; Sphericalization and flattening; Poincare inequality; Radial starlike and meridean-like quasiconvex; Doubling measure

…property of the measure, and the support of a Poincaré inequality by the metric measure space… …support of a Poincaré inequality are preserved by two transformations of the metric measure… …Poincaré inequality in the sense of Heinonen and Koskela’s theory, then so does the transformed… …Poincaré inequality, the transformed space also must satisfy a q-Poincaré inequality for some p… …Poincaré inequality is preserved under the sphericalization/flattening procedure. We also provide… 

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APA (6th Edition):

Li, X. (2015). Preservation of bounded geometry under transformations metric spaces. (Doctoral Dissertation). University of Cincinnati. Retrieved from http://rave.ohiolink.edu/etdc/view?acc_num=ucin1439309722

Chicago Manual of Style (16th Edition):

Li, Xining. “Preservation of bounded geometry under transformations metric spaces.” 2015. Doctoral Dissertation, University of Cincinnati. Accessed September 29, 2020. http://rave.ohiolink.edu/etdc/view?acc_num=ucin1439309722.

MLA Handbook (7th Edition):

Li, Xining. “Preservation of bounded geometry under transformations metric spaces.” 2015. Web. 29 Sep 2020.

Vancouver:

Li X. Preservation of bounded geometry under transformations metric spaces. [Internet] [Doctoral dissertation]. University of Cincinnati; 2015. [cited 2020 Sep 29]. Available from: http://rave.ohiolink.edu/etdc/view?acc_num=ucin1439309722.

Council of Science Editors:

Li X. Preservation of bounded geometry under transformations metric spaces. [Doctoral Dissertation]. University of Cincinnati; 2015. Available from: http://rave.ohiolink.edu/etdc/view?acc_num=ucin1439309722

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