Tudományos publikációk (IK)50160 Tudományos publikációk (IK)http://hdl.handle.net/10831/412024-03-30T04:55:56Z2024-03-30T04:55:56ZLearning to play using low-complexity rule-based policies: Illustrations through Ms. Pac-ManSzita, ILorincz, Ahttp://hdl.handle.net/10831/927692023-09-01T11:47:06Z2007-01-01T00:00:00ZLearning to play using low-complexity rule-based policies: Illustrations through Ms. Pac-Man
Szita, I; Lorincz, A
2007-01-01T00:00:00ZHow reliably can we predict the reliability of protein structure predictions?Miklós, INovák, ÁDombai, BHein, Jhttp://hdl.handle.net/10831/927952023-09-01T13:48:22Z2008-01-01T00:00:00ZHow reliably can we predict the reliability of protein structure predictions?
Miklós, I; Novák, Á; Dombai, B; Hein, J
2008-01-01T00:00:00ZMaximal estimates for the (C, alpha) means of d-dimensional Walsh-Fourier seriesWeisz, Fhttp://hdl.handle.net/10831/928032023-09-01T14:25:54Z2000-01-01T00:00:00ZMaximal estimates for the (C, alpha) means of d-dimensional Walsh-Fourier series
Weisz, F
The d-dimensional dyadic martingale Hardy spaces H(p) are introduced and it is proved that the maximal operator of the (C, alpha) (alpha = (alpha(1),..., alpha(d))) means of a Walsh-Fourier series is bounded from H(p) to L(p) (1/(alpha(k) + 1) < p < infinity) and is of weak type(L(1), L(1)), provided that the supremum in the maximal operator is taken over a positive cone. As a consequence we obtain that the (C, alpha) means of a function f is an element of L(1) converge a.e. to the function in question. Moreover, we prove that the (C; alpha) means are uniformly bounded on H(p) whenever 1/(alpha(k) + 1)< p < infinity. Thus, in case f is an element of H(p), the (C; alpha) means converge to f in H(p) norm. The same results are proved for the conjugate (C; alpha) means, too.
2000-01-01T00:00:00ZEuropean conference on complex systems 2007Jost, JHelbing, DLorincz, AMiddendorf, Mhttp://hdl.handle.net/10831/928632023-09-04T10:27:05Z2008-01-01T00:00:00ZEuropean conference on complex systems 2007
Jost, J; Helbing, D; Lorincz, A; Middendorf, M
2008-01-01T00:00:00Z