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The Fubini theorem and convolution of vector-valued measures. (English) Zbl 0268.28005
MSC:
28A35 Measures and integrals in product spaces
28B05 Vector-valued set functions, measures and integrals
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References:
[1] BERBERIAN S. K.: Measure and integration. New York 1965. · Zbl 0126.08001
[2] BERBERIAN S. K.: Counterexamples in Haar measure. Amer. Math. Monthly 73, 1966, 135-140. · Zbl 0143.04804
[3] de LEEUW K.: The Fubini theorem and convolution formula for regular measures. Math. Scand. 11, 1962, 117-122. · Zbl 0178.05003
[4] DINCULEANU N.: Vector measures. Berlin 1966. · Zbl 0142.10502
[5] DUCHOŇ M.: A convolution algebra of vector-valued measures on compact abelian semigroup. Rev. Roum. Math. Pures et Appl. 16, 1971, 1467-1476. · Zbl 0245.28006
[6] DUCHOŇ M.: On the projective tensor product of vector-valued measures II. Mat. časop. 19, 1969, 228-234. · Zbl 0188.20602
[7] DUCHOŇ M.: On the tensor product of vector measures in locally compact spaces. Mat. časop. 19, 1969, 324-329. · Zbl 0187.00901
[8] HEWITT E., ROSS K. A.: Abstract harmonic analysis I. Berlin 1963. · Zbl 0115.10603
[9] STROMBERG K.: A note on the convolution of regular measures. Math. Scand. 7, 1959, 347-352. · Zbl 0094.30403
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