Recent research reports:

 Cattle, B.A., West, R.M., and Aykroyd, R.G. (2006). Statistical estimation of interface-boundary shapes from electrical impedance tomographic measurements.  STAT06-14 [Abstract] [pdf]

 Aykroyd, R.G., Soleimani, M., and Lionheart, W.R.B. (2006). Conditional-Bayes reconstruction for ERT data using resistance monotonicity information. STAT06-13 [Abstract] [pdf]

 Aykroyd, R.G., Barber, S., Cattle, B.A., Goodwin, D.A., and West, R.M. (2006). Recent advances in statistical modelling and analysis for electrical tomography without image reconstruction. STAT06-12 [Abstract] [pdf]

 West, R.M., Soleimani, M., Aykroyd, R.G., and Lionheart, W.R.B. Speed improvement of MCMC image reconstruction in tomography by partial linearization. STAT06-11 [Abstract] [pdf]  To appear in the International Journal of Tomography and Statistics, 4, 13-23.

 Aykroyd, R.G. and Cattle, B.A. (2006). A flexible statistical and efficient computational approach to object location applied to electrical tomography. STAT06-10. [Abstract] [pdf]

 Aykroyd, R.G. and Cattle, B.A. (2006). A boundary-element approach for the complete-electrode model of EIT illustrated using simulated and real data. STAT06-09. [Abstract] [pdf] To appear in Inverse Problems in Science and Engineering.

Aykroyd, R. G., Sha Meng and West, R. M. (2003). Spatial-temporal modelling for a nonlinear inverse problem in industrial process tomography. Research Report No. STAT-03/05. A similar paper appears in Review of Scientific Equipment, 76, 3703/1-10.

Sha Meng, Aykroyd, R. G. and West, R. M. (2002). An Investigation of deterministic and stochastic strategies for the solution of inverse problems. Research Report No. STAT-02/08.

West, R. M., Aykroyd, R. G. and Sha Meng (2002). Markov chain Monte Carlo techniques for inverse problems. Research Report No. STAT-02/05 . Presented at the British Inverse Problem Workshop, Leeds, 15 April 2002

Aykroyd, R. G. and Haigh, J. G. B. and Allum, G. T. (1999). Bayesian methods applied to survey data from archeological magnetometry. Research Report No. STAT-99/11. Appears in JASA, 96,  64-76.

Aykroyd, R. G. (1999). Approximations for Gibbs Distribution normalising constants. Research Report No. STAT-99/10. Appears in Statistics and Computing.

Aykroyd, R. G. and Zimeras, S. (1999). Inhomogeneous prior models for image reconstruction. Research Report No. STAT-99/01 . A similar paper now appears as JASA, 94, no 447, 934-946.

Allum, G. T., Aykroyd, R. G. and Haigh, J. G. B. (1998). Reconstruction of survey data from archaeological magnetometry using the OSL algorithm. Research Report No. STAT-98/04 (343k).

Aykroyd, R. G. and Zimeras, S. (1997). Automatic reconstruction with inhomogeneous models. Research Report No. STAT-97/07. (See STAT-99/01 above).

Aykroyd, R. G. (1996). Bayesian estimation for homogeneous and inhomogeneous Gaussian random fields. Research Report No. STAT-96/17. Now appears in IEEE-PAMI, 20(5), May 1998.

Aykroyd, R. G. and Mardia, K. V. (1996). An MCMC approach to wavelet warping. Research Report No. STAT-96/14.

Aykroyd, R. G. and Mardia, K. V. (1996). Shape Analysis of Spinal Curves by Wavelet Warping using an MCMC Approach. Research Report No. STAT-96/10 (336K) .

Aykroyd, R. G., Lucy, D. and Pollard, A. M. (1996). Statistical methods for the estimation of human age at death. Research Report No. STAT-96/08 (369K) .

Allum, G. T., Aykroyd, R. G. and Haigh, J. G. B. (1995). Bayesian estimation for archaeological stratigraphy. Research Report No. STAT-95/14. Now appears in JRSS-C, Applied Statistics 48, 1-14.

Allum, G. T., Aykroyd, R. G. and Haigh, J. G. B. (1995). A new statistical approach to reconstruction from area magnetometry data. Report No. 95-70, Department of Mathematics, University of Bradford.

Allum, G. T., Aykroyd, R. G. and Haigh, J. G. B. (1995). Restoration of archaeological magnetometry data by inverse-data methods. Report No. 95-65, Department of Mathematics, University of Bradford.

Complete listing of on-line research reports for The Department of Statistics