Fas-FasL expression and interactions in mouse tumor cell lines: Implications for tumor immune escape

The Fas system, comprising the Fas receptor (Fas/Apo-1/CD95) and its ligand, Fas ligand (FasL), is a central mediator of programmed cell death in various physiological and pathological processes. FasL exists as transmembrane and soluble forms and induces apoptosis on crosslinking with Fas receptor. Recent evidence indicated that tumor cells exploit this system for their immunologic escape that includes the loss of Fas and the gain of FasL expression. In the present study, nine mouse tumor cell lines of diverse origin were examined immunocytochemically for the expression of Fas and FasL. Nine of nine cell lines expressed FasL, and five of nine cell lines expressed Fas. FasL expression in these tumor cell lines was demonstrated to be functional by its induction of apoptosis in Fas-sensitive target cells in coculture experiments. These results suggest that FasL may be a prevalent mediator of immune privilege in mouse malignancies, and support the recently proposed "counterattack model" for local elimination of tumor-reactive immune cells by tumor cell-derived FasL.^ Culture supernatant of four cell lines expressing FasL showed cytotoxic effect on Fas-sensitive target cells, indicating the possibility of secreted FasL in the medium. The Fas-expressing cell lines were sensitized to anti-Fas antibody cytotoxicity following treatment with IL-2 and IFN-$\gamma$, suggesting cytokine stimulation as an effective target for future immunotherapeutic strategies. ^

Association between mean residual life (MRL) and failure rate functions for continuous and discrete lifetime distributions

The purpose of this study was to correct some mistakes in the literature and derive a necessary and sufficient condition for the MRL to follow the roller-coaster pattern of the corresponding failure rate function. It was also desired to find the conditions under which the discrete failure rate function has an upside-down bathtub shape if corresponding MRL function has a bathtub shape. The study showed that if discrete MRL has a bathtub shape, then under some conditions the corresponding failure rate function has an upside-down bathtub shape. Also the study corrected some mistakes in proofs of Tang, Lu and Chew (1999) and established a necessary and sufficient condition for the MRL to follow the roller-coaster pattern of the corresponding failure rate function. Similarly, some mistakes in Gupta and Gupta (2000) are corrected, with the ensuing results being expanded and proved thoroughly to establish the relationship between the crossing points of the failure rate and associated MRL functions. The new results derived in this study will be useful to model various lifetime data that occur in environmental studies, medical research, electronics engineering, and in many other areas of science and technology.