TCGLTourism Corporation of Gujarat Limited (Gandhinagar, India)
TCGLTourism Corporation of Gujarat Ltd. (India)
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References in periodicals archive ?
since [gamma] is TCGL at [gamma](s) with radius r and [v.sub.2] - [v.sub.1] [member of] [T.sub.[gamma]](s).
It is then an immediate result of Lemma 22 that we can find an approximating polygon that is TCGL with radius r.
If [gamma] is TGLL with radius r, then it is TGLL with radius r + [delta] for some [delta] > 0 and there is an approximating polygon [P.sub.[gamma]] which is TCGL with radius r.
TCGL Polygon Is Reconstructible from [g.sub.r] and gs without Tail