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Paper details
Number 2 - June 2014
Volume 24 - 2014
Tikhonov regularization and constrained quadratic programming for magnetic coil design problems
Bartłomiej Garda, Zbigniew Galias
Abstract
In this work, the problem of coil design is studied. It is assumed that the structure of the coil is known (i.e., the positions of
simple circular coils are fixed) and the problem is to find current distribution to obtain the required magnetic field in a given
region. The unconstrained version of the problem (arbitrary currents are allowed) can be formulated as a Least-SQuares
(LSQ) problem. However, the results obtained by solving the LSQ problem are usually useless from the application point of
view. Moreover, for higher dimensions the problem is ill-conditioned. To overcome these difficulties, a regularization term
is sometimes added to the cost function, in order to make the solution smoother. The regularization technique, however,
produces suboptimal solutions. In this work, we propose to solve the problem under study using the constrained Quadratic
Programming (QP) method. The methods are compared in terms of the quality of the magnetic field obtained, and the power
of the designed coil. Several 1D and 2D examples are considered. It is shown that for the same value of the maximum current
the QP method provides solutions with a higher quality magnetic field than the regularization method.
Keywords
coil design problem, constrained quadratic programming, Tikhonov regularization