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pro vyhledávání: '"Raymond J. Grinnell"'
Autor:
Raymond J. Grinnell
Publikováno v:
Quaestiones Mathematicae. 20:127-138
A measure μ on a compact group is called Lorentz-improving if for some 1 > p > ∞ and 1 → q 1 > q 2 ∞ μ *L (p, q 2) ⊆ L(p, q 1). Let T μ denote the operator on L 2 defined by T μ(f) = μ * f. Lorentz-improving measures are characterized in
Autor:
Raymond J. Grinnell
Publikováno v:
Proyecciones (Antofagasta). 14:43-50
Let G be an infinite compact abelian group and let Ꞅ denote its dual group. A borel measure µ on G is called Lorentz-improving if there existe p, q1, and q2, where 1 ∊ } and in terms of n-fold convolution powers. This characterization is analogo
Autor:
Kathryn E. Hare, Raymond J. Grinnell
Publikováno v:
Illinois J. Math. 38, iss. 3 (1994), 366-389
Autor:
Raymond J. Grinnell
Publikováno v:
Proceedings of the American Mathematical Society; Dec1999, Vol. 127 Issue 12, p3547-3556, 10p
Autor:
Grinnell, Raymond J.
Publikováno v:
QM - Quaestiones Mathematicae; Jan1997, Vol. 20 Issue 1, p127-138, 12p