Estimation of the Biphasic Property in a Female’s Menstrual Cycle from Cutaneous Temperature Measured During Sleep

This paper proposes a method to estimate a woman’s menstrual cycle based on the hidden Markov model (HMM). A tiny device was developed that attaches around the abdominal region to measure cutaneous temperature at 10-min intervals during sleep. The measured temperature data were encoded as a two-dimensional image (QR code, i.e., quick response code) and displayed in the LCD window of the device. A mobile phone captured the QR code image, decoded the information and transmitted the data to a database server. The collected data were analyzed by three steps to estimate the biphasic temperature property in a menstrual cycle. The key step was an HMM-based step between preprocessing and postprocessing. A discrete Markov model, with two hidden phases, was assumed to represent higher- and lower-temperature phases during a menstrual cycle. The proposed method was verified by the data collected from 30 female participants, aged from 14 to 46, over six consecutive months. By comparing the estimated results with individual records from the participants, 71.6% of 190 menstrual cycles were correctly estimated. The sensitivity and positive predictability were 91.8 and 96.6%, respectively. This objective evaluation provides a promising approach for managing premenstrual syndrome and birth control.

[1]  Yoshua Bengio,et al.  Markovian Models for Sequential Data , 2004 .

[2]  J. Owen Physiology of the menstrual cycle. , 1975, The American journal of clinical nutrition.

[3]  P Royston,et al.  Identifying the fertile phase of the human menstrual cycle. , 1991, Statistics in medicine.

[4]  G. Kelly,et al.  Body temperature variability (Part 1): a review of the history of body temperature and its variability due to site selection, biological rhythms, fitness, and aging. , 2006, Alternative medicine review : a journal of clinical therapeutic.

[5]  L A Stephenson,et al.  Circadian rhythm changes in core temperature over the menstrual cycle: method for noninvasive monitoring. , 2000, American journal of physiology. Regulatory, integrative and comparative physiology.

[6]  Märtha Sund-Levander,et al.  Normal oral, rectal, tympanic and axillary body temperature in adult men and women: a systematic literature review. , 2002, Scandinavian journal of caring sciences.

[7]  James D Myles,et al.  Modeling biological rhythms in failure time data , 2006, Journal of circadian rhythms.

[8]  K. Moghissi,et al.  Prediction and detection of ovulation. , 1980, Fertility and sterility.

[9]  L. Rabiner,et al.  An introduction to hidden Markov models , 1986, IEEE ASSP Magazine.

[10]  J P Royston,et al.  Basal body temperature, ovulation and the risk of conception, with special reference to the lifetimes of sperm and egg. , 1982, Biometrics.

[11]  S K Hanneman,et al.  Measuring Circadian Temperature Rhythm , 2001, Biological research for nursing.

[12]  Collins Wp,et al.  Ovulation prediction and detection. , 1982 .

[13]  P. Clopton,et al.  Temperature Circadian Rhythms during the Menstrual Cycle and Sleep Deprivation in Premenstrual Dysphoric Disorder and Normal Comparison Subjects , 1997, Journal of biological rhythms.

[14]  E. L. Besch,et al.  A computer method for biorhythm evaluation and analysis , 1974 .

[15]  R L Carter,et al.  A statistical approach to the determination of the fertile period. , 1982, Gynecologic and obstetric investigation.

[16]  Fiona C Baker,et al.  Circadian rhythms, sleep, and the menstrual cycle. , 2007, Sleep medicine.

[17]  Roman Kuc,et al.  Identification of hidden Markov models for ion channel currents. I. Colored background noise , 1998, IEEE Trans. Signal Process..

[18]  G. Kelly,et al.  Body temperature variability (Part 2): masking influences of body temperature variability and a review of body temperature variability in disease. , 2007, Alternative medicine review : a journal of clinical therapeutic.

[19]  James D. Hamilton A New Approach to the Economic Analysis of Nonstationary Time Series and the Business Cycle , 1989 .

[20]  B. Blight,et al.  A Bayesian change-point problem with an application to the prediction and detection of ovulation in women. , 1981, Biometrics.

[21]  D D Baird,et al.  The timing of the “fertile window” in the menstrual cycle: day specific estimates from a prospective study , 2000, BMJ : British Medical Journal.

[22]  S Jager,et al.  The significance of the Fc part of antispermatozoal antibodies for the shaking phenomenon in the sperm-cervical mucus contact test. , 1981, Fertility and sterility.

[23]  Kjersti Aas,et al.  Text page recognition using Grey-level features and hidden Markov models , 1996, Pattern Recognit..

[24]  Kathryn A. Lee Circadian Temperature Rhythms in Relation to Menstrual Cycle Phase , 1988 .

[25]  H. Kong,et al.  Sequence detection and channel state estimation over finite state Markov channels , 1999 .

[26]  Aaron F. Bobick,et al.  Parametric Hidden Markov Models for Gesture Recognition , 1999, IEEE Trans. Pattern Anal. Mach. Intell..

[27]  S. D. Dahale,et al.  Climatology and predictability of the spatial coverage of 5‐day rainfall over Indian subdivisions , 2000 .

[28]  Nikhil S. Padhye,et al.  Cosinor Analysis for Temperature Time Series Data of Long Duration , 2007, Biological research for nursing.

[29]  M. E. Davis,et al.  The cause of physiologic basal temperature changes in women. , 1948, The Journal of clinical endocrinology and metabolism.

[30]  Vincent Fontaine,et al.  Automatic classification of environmental noise events by hidden Markov models , 1998, Proceedings of the 1998 IEEE International Conference on Acoustics, Speech and Signal Processing, ICASSP '98 (Cat. No.98CH36181).

[31]  D. Dunson Bayesian Modeling of the Level and Duration of Fertility in the Menstrual Cycle , 2001, Biometrics.

[32]  S. K. Mandal,et al.  A Multivariate Method for the Parameter Estimation in Biorhythms , 1992 .

[33]  Lawrence R. Rabiner,et al.  A tutorial on hidden Markov models and selected applications in speech recognition , 1989, Proc. IEEE.

[34]  D. Haussler,et al.  Hidden Markov models in computational biology. Applications to protein modeling. , 1993, Journal of molecular biology.

[35]  Royston Jp,et al.  Basal body temperature, ovulation and the risk of conception, with special reference to the lifetimes of sperm and egg. , 1982, Biometrics.

[36]  F Halberg,et al.  Methods for cosinor-rhythmometry. , 1979, Chronobiologia.

[37]  J. Bauman,et al.  Basal body temperature: unreliable method of ovulation detection. , 1981, Fertility and sterility.

[38]  Theodore T. Zuck,et al.  The relation of basal body temperature to fertility and sterility in women , 1938 .