Vector filtering of signals and images has many applications, but there is little theoretical framework underpinning rather ad-hoc approaches to the development of such filters. In this paper we make a significant step towards improving this po-sition by showing that the geometric operations possible on samples or pixels can be expressed in a canonic form. In the formalism of quaternions, this canonic form has at most 4 quaternion coefficients. In the formalism of matrices and groups, the coefficients are 4×4 matrices, or members of the General Linear Group of order 4. We show how to combine series and parallel filters and reduce the result to the canonic form, and we discuss the set of geometric operations possi-ble on vector samples or pi...
Quaternions have been a subject for research in mathematics, physics, and engineering for decades. U...
A quaternion widely linear (QWL) model for quaternion valued mean-square-error (MSE) estimation is p...
Adaptive filtering can be expanded to new numerical systems and unseen sides of physical problems ca...
Development of processing methods for color images has been slow, but over the past 10-15 years idea...
Linear vector colour image processing (LVCIP) has been researched for about two decades in the field...
AbstractWe provide an overview of complex-data and quaternion-based nonlinear adaptive filtering. Th...
Instead of mapping colour image pixels into Euclidean vectors as is conventionally done in colour im...
A novel way to calculate the gradient of real functions of quaternion variables, typical cost functi...
Recent developments in sensor technology, human centered computing and robotics have brought to lig...
Modern techniques treat color images as separate monochrome images for processing. Partly, because t...
This paper presents a new method for devising linear colour-dependent filters based on decomposition...
The Recent developments in sensor technology; human centered computing and robotics have brought to...
Many image and signal processing problems benefit from quaternion based models, due to their propert...
Advances in vector sensor technology have created a need for adaptive nonlinear signal processing in...
Hypercomplex or quaternions numbers have been used recently for both greyscale and colour image proc...
Quaternions have been a subject for research in mathematics, physics, and engineering for decades. U...
A quaternion widely linear (QWL) model for quaternion valued mean-square-error (MSE) estimation is p...
Adaptive filtering can be expanded to new numerical systems and unseen sides of physical problems ca...
Development of processing methods for color images has been slow, but over the past 10-15 years idea...
Linear vector colour image processing (LVCIP) has been researched for about two decades in the field...
AbstractWe provide an overview of complex-data and quaternion-based nonlinear adaptive filtering. Th...
Instead of mapping colour image pixels into Euclidean vectors as is conventionally done in colour im...
A novel way to calculate the gradient of real functions of quaternion variables, typical cost functi...
Recent developments in sensor technology, human centered computing and robotics have brought to lig...
Modern techniques treat color images as separate monochrome images for processing. Partly, because t...
This paper presents a new method for devising linear colour-dependent filters based on decomposition...
The Recent developments in sensor technology; human centered computing and robotics have brought to...
Many image and signal processing problems benefit from quaternion based models, due to their propert...
Advances in vector sensor technology have created a need for adaptive nonlinear signal processing in...
Hypercomplex or quaternions numbers have been used recently for both greyscale and colour image proc...
Quaternions have been a subject for research in mathematics, physics, and engineering for decades. U...
A quaternion widely linear (QWL) model for quaternion valued mean-square-error (MSE) estimation is p...
Adaptive filtering can be expanded to new numerical systems and unseen sides of physical problems ca...