Title :
Barankin Bound for Multiple Change-Point Estimation
Author :
La Rosa, Patricio S. ; Renaux, Alexandre ; Nehorai, Arye
Author_Institution :
Dept. of Electr. & Syst. Eng., Washington Univ. in St. Louis, St. Louis, MO
Abstract :
We derive the Barankin bound on the mean-squared error for multiple change-point estimation of an independent measurement sequence. We first derive a general form of this bound and give the structure of the so-called Barankin information matrix (BIM). We show that the BIM for the change-point parameters has a tri-diagonal structure which means that one change-point estimation depends on its neighboring change points. Using this result, we propose a computationally efficient inversion algorithm of the BIM. As an illustration, we analyze the case of changes in the mean vector of a Gaussian distribution.
Keywords :
estimation theory; matrix algebra; mean square error methods; Barankin bound; Barankin information matrix; Gaussian distribution; independent measurement sequence; inversion algorithm; mean-squared error; multiple change-point estimation; tri-diagonal structure; Biomedical imaging; Econometrics; Force measurement; Performance analysis; Power capacitors; Probability density function; Random variables; Speech processing; Systems engineering and theory; Testing; Barankin lower bounds on the mean-squared error; Multiple change-point estimation; performance analysis;
Conference_Titel :
Computational Advances in Multi-Sensor Adaptive Processing, 2007. CAMPSAP 2007. 2nd IEEE International Workshop on
Conference_Location :
St. Thomas, VI
Print_ISBN :
978-1-4244-1713-1
Electronic_ISBN :
978-1-4244-1714-8
DOI :
10.1109/CAMSAP.2007.4497959
