Lines Matching refs:chain
145 are linked into a chain starting at this target object (cf. figure \ref{relch}).
146 The chain pointer of course overwrites at least a part of the original
149 is the last cell of the relocation chain. It originally contained a pointer, and
155 own relocation chain and at the same time be a member of its target's
156 chain. Morris' algorithm \cite{morris} solves this problem by
164 objects's relocation chain, linking all references to this object.
165 \item the {\em value} cell may be the member of another chain, starting
172 At the end of the Mark\&Link phase there is a relocation chain
175 The last cell of the relocation chain preserves the original tag
185 \caption{Building a relocation chain}
194 In this case the tag cell holds a relocation chain.
204 chain\\
206 1 & 1 & referenced object, tag cell holds relocation chain \\ \hline
259 would destroy the relocation chain.