In some applications it is useful to consider variants of H-measures different from those introduced in the classical or the parabolic case. We introduce the notion of admissible manifold and define variant H-measures on R^d×P for any admissible manifold P. In the sequel we study one special variant, fractional H-measures with orthogonality property, where the corresponding manifold and projection curves are orthogonal, as it was the case with classical or parabolic H-measures, and prove the localisation principle. Finally, we present a simple application of the localisation principle.
On generalisation of H-measures / Erceg, Marko; Ivec, I.. - In: FILOMAT. - ISSN 0354-5180. - 31:16(2017), pp. 5027-5044. [10.2298/FIL1716027E]
On generalisation of H-measures
Erceg, Marko;
2017-01-01
Abstract
In some applications it is useful to consider variants of H-measures different from those introduced in the classical or the parabolic case. We introduce the notion of admissible manifold and define variant H-measures on R^d×P for any admissible manifold P. In the sequel we study one special variant, fractional H-measures with orthogonality property, where the corresponding manifold and projection curves are orthogonal, as it was the case with classical or parabolic H-measures, and prove the localisation principle. Finally, we present a simple application of the localisation principle.| File | Dimensione | Formato | |
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