Add to ORKGInternational audienceWe present a general Fourier-based formalism which provides an accurate prediction of the approximation error, when the derivative of a signal s(t) is continuously reconstructed from uniform point samples or generalized measurements on s. At the heart of the formalism is the frequency error kernel, which can be minimized to design efficient reconstruction schemes which are near optimal in the least-squares sense
International audienceWe investigate the use of a Fourier-domain derivative error kernel to quantify...
International audienceWe investigate the use of a Fourier-domain derivative error kernel to quantify...
This thesis is concerned with the problem of irregular sampling with derivatives. In one dimension, ...
International audienceWe present a general Fourier-based formalism which provides an accurate predic...
International audienceWe present a general Fourier-based formalism which provides an accurate predic...
We present a general Fourier-based formalism which pro-vides an accurate prediction of the approxima...
International audienceWe present a general Fourier-based method which provides an accurate predictio...
International audienceWe present a general Fourier-based method which provides an accurate predictio...
Abstract—We present a general Fourier-based method which provides an accurate prediction of the appr...
In the theory of object reconstruction one needs the derivatives of an experimentally determined qua...
In the theory of object reconstruction one needs the derivatives of an experimentally determined qua...
In the theory of object reconstruction one needs the derivatives of an experimentally determined qua...
In the theory of object reconstruction one needs the derivatives of an experimentally determined qua...
In the theory of object reconstruction one needs the derivatives of an experimentally determined qua...
International audienceWe investigate the use of a Fourier-domain derivative error kernel to quantify...
International audienceWe investigate the use of a Fourier-domain derivative error kernel to quantify...
International audienceWe investigate the use of a Fourier-domain derivative error kernel to quantify...
This thesis is concerned with the problem of irregular sampling with derivatives. In one dimension, ...
International audienceWe present a general Fourier-based formalism which provides an accurate predic...
International audienceWe present a general Fourier-based formalism which provides an accurate predic...
We present a general Fourier-based formalism which pro-vides an accurate prediction of the approxima...
International audienceWe present a general Fourier-based method which provides an accurate predictio...
International audienceWe present a general Fourier-based method which provides an accurate predictio...
Abstract—We present a general Fourier-based method which provides an accurate prediction of the appr...
In the theory of object reconstruction one needs the derivatives of an experimentally determined qua...
In the theory of object reconstruction one needs the derivatives of an experimentally determined qua...
In the theory of object reconstruction one needs the derivatives of an experimentally determined qua...
In the theory of object reconstruction one needs the derivatives of an experimentally determined qua...
In the theory of object reconstruction one needs the derivatives of an experimentally determined qua...
International audienceWe investigate the use of a Fourier-domain derivative error kernel to quantify...
International audienceWe investigate the use of a Fourier-domain derivative error kernel to quantify...
International audienceWe investigate the use of a Fourier-domain derivative error kernel to quantify...
This thesis is concerned with the problem of irregular sampling with derivatives. In one dimension, ...