Statistics and Its Interface

Volume 4 (2011)

Number 1

Comparing statistical methods for removing seasonal variation from vitamin D measurements in case-control studies

Pages: 85 – 93

DOI: http://dx.doi.org/10.4310/SII.2011.v4.n1.a9

Authors

Jiyoung Ahn (Division of Epidemiology, Department of Environmental Medicine, New York University School of Medicine, New York, N.Y., U.S.A.)

Kai Yu (Division of Cancer Epidemiology and Genetics, National Cancer Institute, National Institutes of Health, Bethesda, Maryland, U.S.A.)

Hong Zhang (Division of Cancer Epidemiology and Genetics, National Cancer Institute, National Institutes of Health, Bethesda, Maryland, U.S.A.)

Abstract

Vitamin D deficiency has been shown to be associated with multiple clinical outcomes, including osteoporosis, multiple sclerosis and colorectal cancer. In studies of vitamin D effect on disease outcome, vitamin D status is usually measured by a serum biomarker, namely 25-hydroxy vitamin D [25(OH)D]. Since the circulating 25(OH)D concentration varies from season to season and not all blood samples are collected at the same time, the disease-vitamin D relationship can be obscured if the seasonal variation is not adjusted properly. In the literature, a two-step procedure is usually adopted, with the vitamin D level adjusted for the seasonal variation being obtained in the first step, and the effect of vitamin D being assessed based on the adjusted vitamin D level at the second step. This two-step method can generate misleading results as the estimation variance arising from the first step is not taken into account in the second step analysis.We consider three alternative procedures that unify the two steps into a single model. We conduct an extensive simulation study to evaluate the performance of these methods and demonstrate their applications in a study of 25(OH)D effect on prostate cancer risk.

Keywords

25-hydroxy vitamin D, partial linear model, locally weighted polynomial regression, penalized regression splines, prostate cancer, seasonal pattern, sine curve

2010 Mathematics Subject Classification

Primary 62F03, 62P10. Secondary 92D30.

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