1963
DOI: 10.1259/0007-1285-36-423-163
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II. Dose-time Relationships in Radiotherapy and the Validity of Cell Survival Curve Models

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Cited by 113 publications
(4 citation statements)
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“…I still maintain that the published data suggest that when using daily fractionation the slopes of the iso-effect curves for both skin and squamous cell carcinoma are approximately equal as found by Strandqvist (1944), Paterson (1948) and Fowler and Stern (1963). If plotted against overall time they are both of the order 0-22; if plotted against nominal time they are both of the order 0-29 or slightly higher.…”
supporting
confidence: 60%
“…I still maintain that the published data suggest that when using daily fractionation the slopes of the iso-effect curves for both skin and squamous cell carcinoma are approximately equal as found by Strandqvist (1944), Paterson (1948) and Fowler and Stern (1963). If plotted against overall time they are both of the order 0-22; if plotted against nominal time they are both of the order 0-29 or slightly higher.…”
supporting
confidence: 60%
“…It is important to note that the final solution of most, if not all, of these concepts is predicated on cell death as the major variable of interest, since that is the desired end point in tumors. Interestingly, although Fowler et al had proposed the linear-quadratic (LQ) model in the 1960s, 28,29 it was not until the 1980s, when Withers et al replotted isoeffect data using dose per fraction and demonstrated a differential between the response curves of acutely vs late responding normal tissues, 30,31 that it became clear that tissues that consist of predominantly slowly proliferating tissues, such as brain, 32,33 were more sensitive to changes in fraction size. Thus, the accumulation of biological data, clinical observations and mathematical modeling finally led to a full appreciation and scientific recognition that fractionated irradiation was, indeed, a means of sparing critical late tissues.…”
Section: Normal Tissue Damage Modelsbiological and Mathematicalmentioning
confidence: 99%
“…In 1967, Ellis [6] proposed a mathematical expression relating total dose, treatment duration time and the number of fractions used in the total dose regimen. According to empirical research performed by Fowler [7] and Stern [8] on normal skin tissue, the isoeffect dose was shown to be not only related with time but also with the number of fractions. This was used by Ellis to replace the term T 0,22 with n p in expression (1) above, where n is the number of fractions.…”
Section: Models Based On Empirical Isoeffectmentioning
confidence: 99%