Please use this identifier to cite or link to this item: http://hdl.handle.net/123456789/9029
Title: Mathematical Models of Breast and Ovarian Cancers
Authors: Botesteanu, Dana-Adriana
Lipkowitz, Stanley
Lee, Jung-Min
Levy, Doron
Keywords: ovarian cancer; breast cancer; mathematical modeling; systems biology
Issue Date: 2016
Publisher: Author manuscript
Abstract: Women constitute the majority of the aging United States (US) population, and this has substantial implications on cancer population patterns and management practices. Breast cancer is the most common women's malignancy, while ovarian cancer is the most fatal gynecological malignancy in the US. In this review we focus on these subsets of women's cancers, seen more commonly in postmenopausal and elderly women. In order to systematically investigate the complexity of cancer progression and response to treatment in breast and ovarian malignancies, we assert that integrated mathematical modeling frameworks viewed from a systems biology perspective are needed. Such integrated frameworks could offer innovative contributions to the clinical women's cancers community, since answers to clinical questions cannot always be reached with contemporary clinical and experimental tools. Here, we recapitulate clinically known data regarding the progression and treatment of the breast and ovarian cancers. We compare and contrast the two malignancies whenever possible, in order to emphasize areas where substantial contributions could be made by clinically inspired and validated mathematical modeling. We show how current paradigms in the mathematical oncology community focusing on the two malignancies do not make comprehensive use of, nor substantially reflect existing clinical data, and we highlight the modeling areas in most critical need of clinical data integration. We emphasize that the primary goal of any mathematical study of women's cancers should be to address clinically relevant questions
URI: http://hdl.handle.net/123456789/9029
Appears in Collections:School of Medical Sciences



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