TY  - BOOK
AU  - Muhammad Bin Nasir, 
TI  - Computation of metric and K-dimensions of geometric spaces 
SN  - hbk
U1  - 516 
PY  - 2018///
CY  - Lahore
PB  - Division of Science & Technology, University of Education
KW  - Mathematics--Computation--K-Dimensions--Geometric Spaces
N2  - Let (X, d) be a metric space. A subset B of X is said to be a resolving
set of X if each element of X can be represented uniquely by the distances
d(x, b), ∀ b ∈ B. A subset B of X is fault-tolerant metric generator if B
resolves X and B\{x} also resolve X for any x ∈ B. Fault-tolerant metric
dimension ´ ß(X) is minimum cardinality of fault-tolerant metric generator
B. In this work we are giving basic results for fault-tolerance in metric
dimension of Euclidian space and geometric spaces
ER  -