Measure and integration : publications, 1997-2011/ Heinz Konig.
Material type: TextLanguage: English Series: AnnotationPublication details: Basel ; London : Springer ; 2018 .Edition: 1st edDescription: xi ; 508 ; E4pISBN:- 9783034809818
- 23 515.42 KON
Item type | Current library | Collection | Call number | Status | Date due | Barcode |
---|---|---|---|---|---|---|
General Books | CUTN Central Library Sciences | Non-fiction | 515.42 KON (Browse shelf(Opens below)) | Available | 37693 |
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515.36 MEL Stochastic Cauchy problems in infinite dimensions : | 515.39 SAN Averaging methods in nonlinear dynamical systems / | 515.392 SHI Difference methods for singular perturbation problems / | 515.42 KON Measure and integration : | 515.42 NAI Measure and integration : a first course / | 515.43 BAR A modern theory of integration / | 515.43 BAR A modern theory of integration / |
Electronic books
1: Image measures and the so-called image measure catastrophe --
2: The product theory for inner premeasures --
3: Measure and Integration: Mutual generation of outer and inner premeasures --
4: Measure and Integration: Integral representations of isotone functionals --
5: Measure and Integration: Comparison of old and new procedures --
6: What are signed contents and measures? --
7: Upper envelopes of inner premeasures --
8: On the inner Daniell-Stone and Riesz representation theorems --
9: Sublinear functionals and conical measures --
10: Measure and Integration: An attempt at unified systematization --
11: New facts around the Choquet integral --
12: The (sub/super)additivity assertion of Choquet --
13: Projective limits via inner premeasures and the true Wiener measure --
14: Stochastic processes in terms of inner premeasures --
15: New versions of the Radon-Nikodým theorem --
16: The Lebesgue decomposition theorem for arbitrary contents --
17: The new maximal measures for stochastic processes --
18: Stochastic processes on the basis of new measure theory --
19: New versions of the Daniell-Stone-Riesz representation theorem --
20: Measure and Integral: New foundations after one hundred years --
21: Fubini-Tonelli theorems on the basis of inner and outer premeasures --
13: Measure and Integration: Characterization of the new maximal contents and measures --
14: Notes on the projective limit theorem of Kolmogorov --
15: Measure and Integration: The basic extension theorems --
16: Measure Theory: Transplantation theorems for inner premeasures.
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