Design of close to optimal Euclidean distance MIMO-precoders
(2009) IEEE International Symposium on Information Theory (ISIT), 2009 p.1268-1272- Abstract
- In this work we study the problem of constructing precoders for
spatially multiplexed multiple-input multiple output (MIMO) channels with close to
optimal minimum Euclidean distance. In order to exploit the full
potential of such designs, an ML detector must be used. Our design takes
the decoding complexity into account and constrain it to a
reasonable level. For our simplest case, the ML detector can be
implemented by a Viterbi algorithm operating on a state space of
size equal to the size of the modulation alphabet.
The design problem will be relaxed by using precoders $F$ such that $F^{ast}H^{ast}HF$ is a
cyclic Toeplitz matrix. Within this class... (More) - In this work we study the problem of constructing precoders for
spatially multiplexed multiple-input multiple output (MIMO) channels with close to
optimal minimum Euclidean distance. In order to exploit the full
potential of such designs, an ML detector must be used. Our design takes
the decoding complexity into account and constrain it to a
reasonable level. For our simplest case, the ML detector can be
implemented by a Viterbi algorithm operating on a state space of
size equal to the size of the modulation alphabet.
The design problem will be relaxed by using precoders $F$ such that $F^{ast}H^{ast}HF$ is a
cyclic Toeplitz matrix. Within this class of precoders, the optimal precoder can
be found via linear programming. Of uttermost practical importance
is the discovery that there only exist very few different effective
channels $HF$ even for large MIMO setups; thus, the optimization at the transmitter side reduces
into choosing the best precoder from a small list. Receiver tests will verify that
our method improves upon the currently best precoder designs. (Less)
Please use this url to cite or link to this publication:
https://lup.lub.lu.se/record/1277702
- author
- Rusek, Fredrik LU and Kapetanovic, Dzevdan LU
- organization
- publishing date
- 2009
- type
- Contribution to conference
- publication status
- published
- subject
- pages
- 1268 - 1272
- conference name
- IEEE International Symposium on Information Theory (ISIT), 2009
- conference location
- Seoul, Korea, Democratic People's Republic of
- conference dates
- 2009-06-28 - 2009-07-03
- external identifiers
-
- wos:000280141400258
- scopus:70449515467
- language
- English
- LU publication?
- yes
- id
- 0434be66-9f1b-4484-ba0d-ade8ed4ea8b7 (old id 1277702)
- date added to LUP
- 2016-04-04 13:48:42
- date last changed
- 2022-01-30 00:56:35
@misc{0434be66-9f1b-4484-ba0d-ade8ed4ea8b7, abstract = {{In this work we study the problem of constructing precoders for<br/><br> spatially multiplexed multiple-input multiple output (MIMO) channels with close to<br/><br> optimal minimum Euclidean distance. In order to exploit the full<br/><br> potential of such designs, an ML detector must be used. Our design takes<br/><br> the decoding complexity into account and constrain it to a<br/><br> reasonable level. For our simplest case, the ML detector can be<br/><br> implemented by a Viterbi algorithm operating on a state space of <br/><br> size equal to the size of the modulation alphabet.<br/><br> The design problem will be relaxed by using precoders $F$ such that $F^{ast}H^{ast}HF$ is a<br/><br> cyclic Toeplitz matrix. Within this class of precoders, the optimal precoder can<br/><br> be found via linear programming. Of uttermost practical importance<br/><br> is the discovery that there only exist very few different effective<br/><br> channels $HF$ even for large MIMO setups; thus, the optimization at the transmitter side reduces<br/><br> into choosing the best precoder from a small list. Receiver tests will verify that<br/><br> our method improves upon the currently best precoder designs.}}, author = {{Rusek, Fredrik and Kapetanovic, Dzevdan}}, language = {{eng}}, pages = {{1268--1272}}, title = {{Design of close to optimal Euclidean distance MIMO-precoders}}, year = {{2009}}, }