Given two measure spaces equipped with liftings or densities (complete if liftings are considered) the existence of product liftings and densities with lifting invariant or density invariant sections is investigated. It is proved that if one of the marginal liftings is admissibly generated (a subclass of consistent liftings), then one can always find a product lifting which has the property that all sections determined by one of the marginal spaces are lifting invariant (Theorem 2.13). For a large class of measures Theorem 2.13 is the best possible (Theorem 4.3). When densities are considered, then one can always have a product density with measurable sections, but in the case of non-atomic complete marginal measures there exists no product density with all sections being density invariant. The results are then applied to stochastic processes.
@article{bwmeta1.element.bwnjournal-article-fmv166i3p281bwm, author = {Kazimierz Musia\l\ and W. Strauss and N. Macheras}, title = {Product liftings and densities with lifting invariant and density invariant sections}, journal = {Fundamenta Mathematicae}, volume = {163}, year = {2000}, pages = {281-303}, zbl = {0966.28001}, language = {en}, url = {http://dml.mathdoc.fr/item/bwmeta1.element.bwnjournal-article-fmv166i3p281bwm} }
Musiał, Kazimierz; Strauss, W.; Macheras, N. Product liftings and densities with lifting invariant and density invariant sections. Fundamenta Mathematicae, Tome 163 (2000) pp. 281-303. http://gdmltest.u-ga.fr/item/bwmeta1.element.bwnjournal-article-fmv166i3p281bwm/
[00000] [1] P.Billingsley, Probability and Measure, Wiley, New York, 1979. | Zbl 0411.60001
[00001] [2] A.Blass, handwritten notes, 1999.
[00002] [3] D. L.Cohn, Liftings and the construction of stochastic processes, Trans. Amer. Math. Soc. 246 (1978), 429-438. | Zbl 0407.46039
[00003] [4] D. H.Fremlin, Stable sets of measurable functions, Note of 17 May 1983.
[00004] [5] S.Graf and H. von Weizsäcker, On the existence of lower densities in non- complete measure spaces, in: Measure Theory (Oberwolfach, 1975), A. Bellow and D. Kölzow (eds.), Lecture Notes in Math. 541, Springer, Berlin, 1976, 155-158.
[00005] [6] A.Ionescu and C. Tulcea, Topics in the Theory of Liftings, Springer, Berlin, 1969.
[00006] [7] G.Koumoullis, On perfect measures, Trans. Amer. Math. Soc., 264 (1981), 521-537. | Zbl 0469.28010
[00007] [8] N. D.Macheras, K. Musiał and W. Strauss, On products of admissible liftings and densities, Z. Anal. Anwendungen 18 (1999), 651-667. | Zbl 0947.28005
[00008] [9] N. D.Macheras and W. Strauss, On products of almost strong liftings, J. Austral. Math. Soc. Ser. A 60 (1996), 1-23. | Zbl 0879.28008
[00009] [10] W.Sierpiński, Fonctions additives non complètement additives et fonctions non mesurables, Fund. Math. 30 (1939), 96-99. | Zbl 0018.11403
[00010] [11] M.Talagrand, Pettis Integral and Measure Theory, Mem. Amer. Math. Soc. 307 (1984). | Zbl 0582.46049
[00011] [12] M.Talagrand, On liftings and the regularization of stochastic processes, Probab. Theory Related Fields 78 (1988), 127-134. | Zbl 0627.60046
[00012] [13] M.Talagrand, Closed convex hull of set of measurable functions, Riemann-measurable functions and measurability of translations, Ann. Inst. Fourier (Grenoble) 32 (1989), 39-69.
[00013] [14] M.Talagrand, Measurability problems for empirical processes, Ann. Probab. 15 (1987), 204-212. | Zbl 0622.60040
[00014] [15] T.Traynor, An elementary proof of the lifting theorem, Pacific J. Math. 53 (1974), 267-272. | Zbl 0258.46043