Home  |  Centre for Mathematical Sciences  |  LTH  |  LU


The Mathematical Imaging Group is a research group within the Centre for Mathematical Sciences. The research within the group can roughly be divided into geometric computer vision, cognitive vision and medical image analysis. Here follows a description of research themes and projects that we pursue within the group. We encourage you to also study our publication list.

Research by Themes

Global Optimization Methods

Many mathematical problems in vision are non-convex and traditional local optimization methods risk getting stuck in local optima. The goal is to develop new global approaches, independent of initialization, with performance guarantees.

Active projects:

Multiple View Geometry

Within this research theme we study the interplay between images, 3D scene models and camera position and orientation. One typical problem is trying to calculate scene structure and camera motion given only image data. The underlying framework for studying the geometry of images is based on projective geometry. Our research covers both theory and algorithms and typical applications are: large scale 3D reconstructions, image based localization, autonomous navigation, panoramic image stitching, camera calibration, etc.

Active projects:

Cognitive Vision

Cognition is defined as "the process of knowing, understanding and learning things". Cognitive vision includes abilities to generate explicit representations of the world in terms of structures, objects and events, and their relations and dynamics, for action generation or communication. Our research within cognitive vision is focused on problems such as categorization and detection of objects and events in images, shape variation, learning, and context in computer vision.

Active projects:

Variational Calculus in Image Analysis

Curve and surface problems appear naturally within the field of computer vision. For example, often one wants to find the minimal surface of an energy functional in order to reconstruct the shape of an object or one wants to find the optimal curve for segmenting a noisy image.

Active projects:

Polynomial Equations in Vision

Polynomial equations arise in many geometric computer vision problems. Contrary to the situation with linear systems, where one can solve large systems extremely efficiently, the picture is here much more complicated. We try to combine algebraic geometry with efficient computational techniques to come up with new numerical methods for polynomial equations.

Active projects:

Vision in Robotics

To give an industrial robot of today a new task, quite a lot of programming work is required as it is done on a very low level. This research tries to lift the programming to a higher level at which different kinds of sensors are used. That information can then be used as primitives in the programming and to build safe robots that can work together with humans without putting the human at risk of being hurt.

Active projects:

Biological Vision

In this multidisciplinary theme we work together with researchers in biology. We investigate how visual systems are built and evolve, and how this knowledge of biological systems can be extended to machine vision. For instance primitive visual systems in lower animals typically serve only one or a few visual tasks, and their simple and machine-like features are excellent sources for bio-inspired new technologies in machine vision and robotics.

Active projects:

Medical Image Analysis

Medical Image Analysis is a growing field where the need for automatic tools are increasing. Problems include detection, segmentation, visualization and decision support for diagnosis. We cooperate with a number of hospitals and work on real data, developing mathematical theory, algorithms, and prototype applications.

Active projects:

Traffic Analysis and Surveillance

By analysing the motion of road users it is possible accurately predict the number of accidents that will occur and thereby asses how safe it is. Today this process is performed manually with observers spending several days standing in the intersections. This research aims at automating the process by using video analytics and surveillance cameras.

Active projects:


Questions: webmaster
Last updated: 2018-03-21

Centre for Mathematical Sciences, Box 118, SE-22100, Lund. Phone: 046-222 00 00