First Page | Document Content | |
---|---|---|
Date: 2013-09-30 18:39:35Null set Measure Lebesgue measure Uniform convergence Dominated convergence theorem Sigma-algebra Mathematical analysis Measure theory Measurable function | Add to Reading ListSource URL: www.math.harvard.eduDownload Document from Source WebsiteFile Size: 106,16 KBShare Document on Facebook |
1 Preliminaries: A function f : R −→ R is additive if it satisfies the Cauchy equation (CE) f (x+y) = f (x)+f (y)DocID: 1r5HJ - View Document | |
Analysis of the Theory of Functions of One Real Variable, AnDocID: 1quSU - View Document | |
corrected version ofppin katz-sarnak) Fix integers r ≥ 1 and N ≥ 2, and denote by ú := úr := (1, 1,..., 1) in %r. For any non-negative Borel measurable function function g ≥ 0 on %r, denote byDocID: 1qrUF - View Document | |
Classical Young Measures in the Calculus of Variations Author: Marcus Webb Supervisor: Filip Rindler Cambridge Centre for AnalysisDocID: 1qkOq - View Document | |
A Framework for the Analysis of Self-Con…rming Policies P. Battigalli,a S. Cerreia-Vioglio,a F. Maccheroni,a M. Marinacci,a T. Sargentb a bDocID: 1q5Qv - View Document |