Synergy Determination Issues

A recent paper by F. Verrier and coworkers presented the combination of antibodies against a human immunodeficiency virus (HIV) type 1 isolate (8). In the paper was described a “new mathematical treatment” of determining synergism, additive effect, or antagonism. Its verbatim reasoning used symbols but without any mathematical derivations, since it is claimed to be “model free.” It is not possible to find the origin of these equations without changing symbols of equations previously published by others. It further discussed Chou and Talalay's equations and method (7) and indicated their deficiencies. As a co-originator of the Chou-Talalay combination index method, I would like to respond to the issues raised by Verrier et al. and to point out that the comments of Verrier et al., in many parts, are erroneous or confusing.

(i) A close examination of their paper indicates that the new method of Verrier et al. is the same as the Webb method (i.e., the fractional product method) published nearly 40 years ago (9).

(ii) Chou and Talalay have actually derived the fractional product equation based on the mass-action law principle and proved that the fractional product method has the following limitations (1, 3, 4, 7): (a) It is valid only for pure, mutually nonexclusive conditions (e.g., no conformational changes or no allosteric effects). (b) It is valid only when the dose-effect relationships show exact hyperbolic curves (i.e., m = 1) but is not valid for sigmoidal curves (i.e., m ≠ 1). (In reality, for most biological systems, the value of m is ≠1.) (c) It is not consistent with the classic isobologram. (Chou and Talalay had to present the nonclassic conservative isobologram to describe the nonexclusive case.) (d) It takes into account the potency but totally ignores the shape of the dose-effect curves of each drug involved in the combination. (e) It leads to underestimation of synergism or overestimation of antagonism when compared with the classic isobologram method.

Chou and Talalay mathematically derived over 200 equations and have considered various conditions (e.g., number of reactants and products, reaction mechanisms and sequences, type of inhibition, exclusivity of inhibition, etc.) before publishing their generalization (1, 3, 4, 5, 7). To date, the median-effect equation of Chou and the combination index method of Chou and Talalay have been cited in over 1,750 biomedical scientific papers worldwide. For reference 7 alone, there have been over 813 citations since 1984 (based on Web of Science statistics; www.isiglobalnet.com). Although some of the comments on the Chou and Talalay method by Verrier et al. are correct, the following description and comments are inaccurate:

(i) “The theory of Chou and Talalay is based on enzyme kinetics”: the enzyme kinetic models used by Chou and Chou-Talalay are entirely based on the mass-action law principle. Enzyme kinetics is only used as the model or tool (1, 3, 4, 7). Mass-action law is the fundamental rule of the physicochemical world. The statistical approach has been used for drug combination studies for more than 60 years and has not yet shown general acceptance. While statistics are useful for probability, correlation, variance, and significance, they do not form the basis for the dose-effect relationship mechanisms of ligands, reactants, or chemicals.

(ii) “This [the Chou-Talalay method] requires that both Abs [drugs] used in a combination be capable of neutralizing the virus used [efficacious] in the experiment”: if one of the components in the combination has no effect, then it is not a drug and synergism or antagonism is irrelevant. This issue has been clearly defined by Chou et al. as potentiation-enhancement or inhibition-suppression. In this simple arithmetical situation, percent potentiation, fold enhancement, etc., will suffice for its quantitation (2, 6, 7).

(iii) “. . . therefore they are not mutually exclusive in their ability to bind”: the mutually exclusive and mutually nonexclusive combinations are the two extreme cases used in Chou-Talalay's theoretical derivations since the 1970s (1, 3, 4). Following years of application in experimental systems, it has been concluded that if a unified method is to be used in the absence of exact knowledge of exclusivity, the choice will be exactly consistent with the classic isobologram, which is the exclusive case (2, 6). The general isobologram equation for two or more drug combinations was derived by Chou and Talalay in 1984 (7).