The classical problem of extrapolation of a bandlimited signal from limited time domain data is revisited for signals defined on the sphere. That is, given limited or incomplete measurements of a low pass signal on the unit sphere, find the unique extrapolation to the complete unit sphere. Signals defined on the unit sphere arise in a number of applications, such as beampatterns in azimuth and elevation and head related transfer functions. Our investigations explore the role of integral equation operators in characterizing the extrapolation problem which leads to an iterative algorithm analogous to that obtained in the time-frequency case
Signals collected with spherical geometry appear in a large number and diverse range of real-world a...
Abstract. It has long been known that a spherical harmonic analysis of gridded (and noisy) data on a...
Signals defined on the unit sphere cannot be simultaneously concentrated in a spatial region and in ...
We investigate the problem of extrapolation of band-limited signals on the 2-sphere in the presence ...
In this paper, we consider the problem of signal extrapolation for discrete (i.e., sampled) signals ...
Functions on the sphere appear in several applications, including geodesics, imaging and acoustics. ...
This paper is concerned with the band-limited signal extrapolation using a truncated series of Prola...
The work is concerned with the band-limited signal extrapolation using truncated series of prolate s...
We present the generalized iterative residual fitting (IRF) for the computation of the spherical har...
The basic theory of spherical singular integrals is recapitulated. Criteria are given for measuring ...
Signals defined on the unit sphere cannot be simultaneously concentrated in a spatial region and in ...
The basic theory of spherical singular integrals is recapitulated. Criteria are given for measuring ...
Abstract—We develop a sampling scheme on the sphere that permits accurate computation of the spheric...
For the accurate representation and reconstruction of band-limited signals on the sphere, an optimal...
Extrapolation of band-limited signals gained scientific attention over the last 60 years. Thefamous ...
Signals collected with spherical geometry appear in a large number and diverse range of real-world a...
Abstract. It has long been known that a spherical harmonic analysis of gridded (and noisy) data on a...
Signals defined on the unit sphere cannot be simultaneously concentrated in a spatial region and in ...
We investigate the problem of extrapolation of band-limited signals on the 2-sphere in the presence ...
In this paper, we consider the problem of signal extrapolation for discrete (i.e., sampled) signals ...
Functions on the sphere appear in several applications, including geodesics, imaging and acoustics. ...
This paper is concerned with the band-limited signal extrapolation using a truncated series of Prola...
The work is concerned with the band-limited signal extrapolation using truncated series of prolate s...
We present the generalized iterative residual fitting (IRF) for the computation of the spherical har...
The basic theory of spherical singular integrals is recapitulated. Criteria are given for measuring ...
Signals defined on the unit sphere cannot be simultaneously concentrated in a spatial region and in ...
The basic theory of spherical singular integrals is recapitulated. Criteria are given for measuring ...
Abstract—We develop a sampling scheme on the sphere that permits accurate computation of the spheric...
For the accurate representation and reconstruction of band-limited signals on the sphere, an optimal...
Extrapolation of band-limited signals gained scientific attention over the last 60 years. Thefamous ...
Signals collected with spherical geometry appear in a large number and diverse range of real-world a...
Abstract. It has long been known that a spherical harmonic analysis of gridded (and noisy) data on a...
Signals defined on the unit sphere cannot be simultaneously concentrated in a spatial region and in ...