We describe a multiscale method for source parameter estimations (depth to the source, homogeneity degree) based on a new theory, which we propose for studying explicitly inhomogeneous field. The theory consists in enlarging the set of homogeneous fields with those having a fractional homogeneity-degree and in relaxing the standard homogeneous equation to a local homogeneity equation. We show the validity of the method as applied to the inhomogeneous-degree gravity fields of a finite vertical cylinder.
Local homogeneity of potential fields and fractional homogeneous functions: a new theory for improved source parameter estimation / Fedi, M., Florio, G., Paoletti, V.. - (2012), pp. 1-5. (82nd Annual Meeting of the Society of Exploration Geophysicists Las Vegas (USA) 4-9 November 2012) [10.1190/segam2012-1169.1].
Local homogeneity of potential fields and fractional homogeneous functions: a new theory for improved source parameter estimation
FEDI, MAURIZIO;FLORIO, GIOVANNI;PAOLETTI, VALERIA
2012
Abstract
We describe a multiscale method for source parameter estimations (depth to the source, homogeneity degree) based on a new theory, which we propose for studying explicitly inhomogeneous field. The theory consists in enlarging the set of homogeneous fields with those having a fractional homogeneity-degree and in relaxing the standard homogeneous equation to a local homogeneity equation. We show the validity of the method as applied to the inhomogeneous-degree gravity fields of a finite vertical cylinder.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
