Upload
others
View
39
Download
0
Embed Size (px)
Citation preview
Richard Morwood
Optometrist
Phone H
ub
Houstons
Houstons
Houstons
Houstons
The N
ew
O
rchard
Regatta O
utlet
@ S
D K
ells
Quinn
Houstons
Wedding Studio
Walshs
Newsagents
M. Higgins
(PH)
A.J Quinn & Sons
Town Hall
Post Office
TOALS
Bookmakers
Super-Fry
Planet Hair & Beauty
Katriona
Tan City
Hair & Beauty
Consultants
(Unoccupied)
Tow
n H
all
W.D
. B
entley &
C
o
Money M
atters
(U
noccupied)
Wray
Dry C
leaners
Self H
elp A
frica
Deluxe B
arber
Thai Lanna
Cafe M
arm
alade
Saw
yers &
C
o.
Ulster B
ank
Fred E
lliots
Children's
Designer
Wear
Con Lavery
& C
o
Solicitors
Casino 7
Rosehip
Cafe
W. M
ulligan
Ace of
Cards
(U
noccupied)
Im
perial Inn
(U
noccupied)
Red
Dragon
The C
iggie S
hop
Gardner &
A
llen
Optom
etrists
Diam
ond D
olls
(U
noccupied)
Bedw
in S
oft
Furnishings
Housing
Executive
Thompson Tyres
(U
n
o
c
c
u
p
ie
d
)
W
o
v
e
n
J
o
h
n
M
c
B
u
r
n
e
y
S
o
l
i
c
i
t
o
r
s
(
U
n
o
c
c
u
p
i
e
d
)
Citizens A
dvice
F
i
n
a
n
c
e
&
M
o
r
t
g
a
g
e
S
t
o
r
e
Affinity T
iles &
Bathroom
s
T
h
e
T
a
n
S
t
a
n
d
Friar T
uck
Take A
way
(U
noccupied)
Elk &
C
lipper
(U
noccupied)
J.A
. Lyttle
The C
ut
Faith M
ission
Bookshop
Next
Generation
Danske
Bank
Em
met J. K
elly
Soliciors
George A
rm
strong
Jew
ellers
Crorys
Lucy &
C
o
Bank of Ireland
(U
noccupied)
Clear P
harm
acy
Salon V
ogue
The D
resser
Thia N
oodle
Porters
David R
ogers
(U
noccupied)
To Let
A T
ouch of P
ink
(U
noccupied) ?
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
D
P
D
P
D
P
S
C
S
C
R
S
7
3
.
2
1
F
L
7
3
.
1
0
F
L
72
.6
6=
Un
de
rS
id
e A
rch
72
.1
7=
Un
de
rS
id
e A
rch
T
o
p
o
f
W
a
ll=
7
3
.
7
1
T
o
p
o
f
W
a
ll=
7
3
.
7
6
G
G
G
G
G
G
G
G
G
G
G
G
G
G
G
G
G
G
G
G G
G
G
G
G
G
G
G
G
G
G
G
G
G
GG
G
G
G
G
G
G
G
B
B
B
B
BB
B
B
B
B
B
B
B
B
B
B
B
B
B
B
B
B
B
B
B
B
BB
B
B
B
B
B
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
T
o
p
o
f
W
a
ll=
7
3
.
4
0
M
k
r
M
k
r
T
o
p
o
f
W
a
ll=
7
3
.
3
9
T
o
p
o
f
W
a
ll=
7
3
.
2
4
T
o
p
o
f
W
a
ll=
7
3
.
4
0
T
o
p
o
f
W
a
ll=
7
3
.
2
2
T
o
p
o
f
W
a
ll=
7
2
.
2
1
T
o
p
o
f
W
a
ll=
7
0
.
7
2
T
o
p
o
f
W
a
ll=
6
8
.
8
2
T
o
p
o
f
W
a
ll=
6
8
.
8
5
T
o
p
o
f
W
a
ll=
7
1
.
5
0
T
o
p
o
f
W
a
ll=
7
4
.
0
9
T
o
p
o
f
W
a
ll=
7
4
.
1
5
T
o
p
o
f
W
a
ll=
7
3
.
0
9
T
o
p
o
f
W
a
ll=
6
6
.
3
4
T
o
p
o
f
W
a
ll=
7
3
.
0
4
T
o
p
o
f
W
a
ll=
6
5
.
7
7
T
o
p
o
f
W
a
ll=
6
4
.
2
5
T
o
p
o
f
W
a
ll=
6
4
.
9
8
T
o
p
o
f
W
a
ll=
6
3
.
1
4
T
o
p
o
f
W
a
ll=
6
3
.
6
3
T
o
p
o
f
W
a
ll=
6
3
.
6
7
T
o
p
o
f
W
a
ll=
6
4
.
4
6
T
o
p
o
f
W
a
ll=
6
5
.
4
1
T
o
p
o
f
W
a
ll=
6
6
.
1
5
I
L
=
6
0
.
9
6
(
U
n
lif
t
a
b
le
)
M
H
M
H
I
L
=
7
1
.
3
3
M
H
I
L
=
6
9
.
4
9
M
H
I
L
=
6
9
.
6
8
C
a
b
le
s
M
H
M
H
M
H
6
7
.
0
2
M
H
6
7
.
2
7
6
8
.
5
9
(
B
lo
c
k
e
d
)
I
L
=
6
7
.
3
5
M
H
M
H
I
L
=
6
3
.
0
5
I
L
=
6
2
.
4
3
M
H
6
6
.
6
4
M
H
6
7
.
2
7
M
H
M
H
M
H
I
L
=
6
2
.
4
3
M
H
I
L
=
6
6
.
1
5
M
H
I
L
=
5
7
.
1
8
M
H
I
L
=
5
6
.
7
9
M
H
6
3
.
9
9
I
C
S
VS
V
S
V
S
V
S
V
S
V
S
V
S
V
S
V
S
V
S
V
S
V
S
V
F
H
F
H
F
H
F
H
F
H
G
a
s
A
V
A
V
C
/
B
o
x
C
/
B
o
x
C
/
B
o
x
C
/
B
o
x
C
/
B
o
x
C
/
B
o
x
C
/
B
o
x
C
/
B
o
x
C
/
B
o
x
S
C
S
C
S
C
S
C
S
C
S
C
S
C
S
C
S
C
S
C
S
C
S
C
S
C
S
C
L
P
L
P
L
P
L
P
L
P
L
PL
P
L
P
L
P
L
P
L
P
L
P
L
P
L
P
L
P
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
S
C
S
C S
C
S
C
S
C
S
C
S
C
S
C
S
CS
C
7
2
.
8
7
F
L
7
2
.
1
1
F
L
7
0
.
8
4
F
L
7
0
.
4
2
F
L
6
8
.
9
6
F
L
6
5
.
6
3
F
L
6
4
.
3
6
F
L
6
4
.
1
6
F
L
6
3
.
1
0
F
L
7
1
.
3
4
F
L
7
1
.
1
7
F
L
7
0
.
7
8
F
L
7
0
.
8
1
F
L 6
8
.
5
8
F
L
6
7
.
1
1
F
L
7
2
.
9
4
F
L
6
5
.
4
2
F
L
T
L
T
L
T
L
D
P
D
P
D
P
D
P
D
P
D
PD
P
G
a
sG
a
s
G
a
s
G
a
s
G
a
s G
a
s
G
a
s
G
a
s
G
a
s
S
ig
n
S
ig
n
7
1
.
5
7
M
H
I
L
=
7
0
.
1
3
M
H
(
V
o
id
D
u
c
t
s
)
M
H
(
U
n
lif
t
a
b
le
)
M
H
7
1
.
4
7
M
H
7
1
.
6
0
M
H
7
1
.
5
9
M
H
I
L
=
7
0
.
4
6
M
H
7
1
.
7
3
M
H
(
B
lo
c
k
e
d
)
M
H
(
B
lo
c
k
e
d
)
M
H
(
U
n
lif
t
a
b
le
)
M
H
(
B
lo
c
k
e
d
)
M
H
G
G
G
G
G
G
G
G
G
G
G
G
G
G
G
G
G
G
G
G
G
G
G
G
G
G
C
/
B
o
x
C
/
B
o
x
C
/
B
o
x
C
/
B
o
x
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
S
ig
n
L
P
L
P
L
P
L
P
L
P
L
P
L
P
L
P
L
P
S
C
S
C
S
C
S
C
S
C
S
C
S
C
S
C
S
C
S
C
D
P
D
P
D
P
D
P
D
P
7
2
.
7
7
F
L
7
2
.
4
0
F
L
7
2
.
2
3
F
L
7
2
.
2
4
F
L
7
2
.
5
8
F
L
7
2
.
5
4
F
L
7
2
.
9
2
F
L
7
3
.
0
9
F
L
7
1
.
7
8
F
L
7
1
.
8
1
F
L
7
1
.
9
3
F
L
7
1
.
6
0
F
L
7
1
.
8
1
F
L
7
1
.
8
8
F
L
7
1
.
7
9
F
L
7
1
.
4
0
F
L
7
2
.
0
6
F
L
6
8
.
6
4
F
L
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
S
V
S
V
S
V
S
V
S
V
S
V
(
U
n
lif
t
a
b
le
)
M
H
(
B
o
lt
e
d
)
M
H
S
u
m
p
=
7
0
.
2
6
M
H
I
L
=
7
0
.
5
6
M
H
(
U
n
lif
t
a
b
le
)
M
H
(
B
lo
c
k
e
d
)
M
H
B
B
B
B
B
B
BB
B
B
B B
B B
B B
B B
B
B
B
B
B
B
B
B
B
B
B
B
B
B
B
B
B
B
B
B
BB
B
B
B
B
B
B
B B
B
B
B
B
G
a
s
G
a
s
G
a
s
G
a
s
G
a
s
G
a
s
G
a
s
F
H
F
H
F
H
T
P
T
P
T
P
P
o
s
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
a
s
T
o
p
o
f
F
e
n
c
e
=
7
3
.
1
6
T
o
p
o
f
F
e
n
c
e
=
7
1
.
6
4
T
o
p
o
f
F
e
n
c
e
=
7
5
.
3
9
T
o
p
o
f
W
a
ll=
7
4
.
4
1
T
o
p
o
f
F
e
n
c
e
=
7
3
.
4
3
T
o
p
o
f
W
a
ll=
7
5
.
8
6
T
o
p
o
f
W
a
ll=
7
2
.
2
2
T
o
p
o
f
W
a
ll=
7
1
.
2
0
6
8
.
5
3
6
8
.
5
3
M
H
M
H
B
BB
B
I
C
B
6
8
.
5
9
I
C
7
1
.
5
8
I
C
7
1
.
5
8
7
1
.
5
6
7
1
.
4
8
I
C
7
1
.
6
7
I
C
I
C
7
0
.
5
5
M
H
D
P
D
PD
P
D
P
D
P
D
P
D
P
D
P D
P
D
P
D
P
D
P
D
P
D
P
D
P
D
P
D
P
D
P
D
P
D
P
D
P
D
P
D
P
5
9
.
2
7
F
L
6
0
.
3
1
F
L
6
1
.
2
0
F
L
6
1
.
5
2
F
L
6
1
.
8
9
F
L
6
2
.
8
4
F
L
5
9
.
6
7
F
L
6
0
.
2
7
F
L
6
0
.
7
7
F
L
6
1
.
7
3
F
L
6
2
.
4
9
F
L
6
2
.
5
0
F
L
6
2
.
5
1
F
L
5
6
.
3
4
F
L
5
6
.
7
6
F
L
5
7
.
0
5
F
L
5
8
.
5
6
F
L
5
9
.
8
7
F
L
5
9
.
8
7
F
L
5
6
.
6
6
F
L
5
5
.
7
4
F
L
5
6
.
6
4
F
L
5
5
.
7
5
F
L
5
6
.
1
8
F
L
5
5
.
8
3
F
L
5
6
.
3
9
F
L
5
6
.
7
0
F
L
5
5
.
9
6
F
L
5
5
.
8
8
F
L
G
G
G
G
G
G
G
G
G
G
G
G G G
G
G
G
G
G
G
G
G
G
G
G
G
G
G
G
G
G
G
G
G
G
G
G
G
G
GGG
G
G
G
G
GG
G
G
G
G
G
G
G
G
G
G
G
G
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
R
S
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
L
P
L
P
L
P
L
P
L
P
L
P
L
P
L
P
L
P
L
P
L
P
L
P
L
P
L
P
L
P
L
P
S
C
S
C
S
C
S
C
S
C
S
C S
C
S
C
S
C
S
C
S
C
S
C
S
C
S
C
S
C
S
C
S
C
S
C
S
C
S
C
S
C
S
C
S
C
S
C
S
C
S
C
S
C
S
C
S
C
S
C
S
C
S
C
B
B
B
B B
B
B B
B
BB
BB
B
BB
B
B
B
B
B
B B
B
B
B
B
B
B
B
B
B
B
T
L
T
L
T
L
T
L
T
L
T
L
T
L
T
L
T
L
T
L
T
L
T
L
C
/
B
o
x
C
/
B
o
x
C
/
B
o
x
C
/
B
o
x
C
/
B
o
x
C
/
B
o
x
C
/
B
o
x
(
U
n
lif
t
a
b
le
)
M
H
I
L
=
5
9
.
9
9
M
H
(
U
n
lif
t
a
b
le
)
M
H
I
L
=
5
6
.
7
5
M
H
I
L
=
5
7
.
3
7
M
H
I
L
=
5
4
.
9
1
M
H
(
U
n
lif
t
a
b
le
)
M
H
I
L
=
5
1
.
6
4
M
H
I
L
=
5
4
.
1
8
M
H
I
L
=
5
6
.
4
5
M
H
I
L
=
5
6
.
3
6
M
H
I
L
=
5
6
.
3
2
M
H
I
L
=
5
2
.
6
1
M
H
I
L
=
5
6
.
0
4
M
H
I
L
=
5
6
.
6
3
M
H
I
L
=
5
7
.
9
0
M
H
G
a
s
G
a
s
G
a
s
S
V
S
V
S
V
S
V
S
V
S
V
S
V
S
V
F
H
F
H
F
H
F
H
G
a
s
M
k
r
M
k
r
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
S
ig
n
S
ig
n
S
ig
n
S
ig
n
5
8
.
1
9
I
C
(
C
e
lla
r
)
5
7
.
0
1
I
C
5
6
.
9
9
I
C
P
o
s
t
/
B
o
x
C
C
T
V
T
o
p
o
f
W
a
ll=
5
6
.
6
0
T
o
p
o
f
W
a
ll=
5
6
.
5
8
T
o
p
o
f
W
a
ll=
5
6
.
5
9
T
o
p
o
f
W
a
ll=
5
8
.
0
3
T
o
p
o
f
W
a
ll=
5
8
.
0
2
T
o
p
o
f
W
a
ll=
5
8
.
0
3
T
o
p
o
f
W
a
ll=
5
8
.
0
1
T
o
p
o
f
W
a
ll=
5
8
.
0
1
T
o
p
o
f
W
a
ll=
5
8
.
4
9
T
o
p
o
f
W
a
ll=
5
8
.
4
9
T
o
p
o
f
W
a
ll=
5
8
.
5
6
T
o
p
o
f
W
a
ll=
5
8
.
9
9
T
o
p
o
f
W
a
ll=
5
8
.
5
5
T
o
p
o
f
W
a
ll=
5
7
.
9
8
T
o
p
o
f
W
a
ll=
5
7
.
6
5
T
o
p
o
f
W
a
ll=
5
7
.
6
5
T
o
p
o
f
W
a
ll=
5
7
.
6
0
T
o
p
o
f
W
a
ll=
5
7
.
5
9
T
o
p
o
f
W
a
ll=
5
7
.
5
8
T
o
p
o
f
W
a
ll=
5
8
.
8
6
T
o
p
o
f
W
a
ll=
5
8
.
7
9
T
o
p
o
f
W
a
ll=
5
9
.
7
7
T
o
p
o
f
W
a
ll=
5
9
.
7
9
T
o
p
o
f
W
a
ll=
6
1
.
1
9
T
o
p
o
f
W
a
ll=
5
9
.
8
4
T
o
p
o
f
W
a
ll=
5
9
.
7
7
T
o
p
o
f
W
a
ll=
5
9
.
5
7
S
V
S
V
5
5
.
8
4
M
H
(
U
n
lif
t
a
b
le
)
M
H
I
L
=
5
2
.
0
4
M
H
S
u
m
p
=
5
2
.
5
3
M
H
5
9
.
2
7
M
H
(
B
lo
c
k
e
d
)
M
H
T
o
p
o
f
F
e
n
c
e
=
5
7
.
0
7
T
o
p
o
f
F
e
n
c
e
=
6
0
.
3
4
W
M
S
V
S
C
S
C
S
C
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
U
t
ilit
y
C
o
v
e
r
L
P
L
P
L
P
L
P
L
P
S
ig
n
S
ig
n
S
ig
n
T
L
T
L
T
L
T
L
T
L
T
L
T
L
T
L
T
L
G
G
G
F
H
F
H
F
H
S
V
S
V
S
V
S
V
S
V
(
B
lo
c
k
e
d
)
M
H
(
B
lo
c
k
e
d
)
M
H
(
U
n
lif
t
a
b
le
)
M
H
(
U
n
lif
t
a
b
le
)
M
H
R
S
C
/
B
o
x
C
/
B
o
x
C
/
B
o
x
C
/
B
o
x
D
P
D
P
D
P
D
P
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
G
r
o
u
n
d
/
L
ig
h
t
5
5
.
2
0
F
L
5
5
.
4
6
F
L
5
5
.
0
9
F
L
M
k
r
M
k
r
M
k
r
M
k
r
T
o
p
o
f
W
a
ll=
5
6
.
4
3
T
o
p
o
f
W
a
ll=
5
6
.
2
2
T
o
p
o
f
W
a
ll=
5
6
.
8
4
T
o
p
o
f
W
a
ll=
5
7
.
3
5
T
o
p
o
f
W
a
ll=
5
7
.
3
4
T
o
p
o
f
W
a
ll=
5
7
.
3
8
T
o
p
o
f
W
a
ll=
5
6
.
6
0
T
o
p
o
f
W
a
ll=
5
6
.
9
6
T
o
p
o
f
F
e
n
c
e
=
5
7
.
8
2
T
o
p
o
f
F
e
n
c
e
=
5
8
.
2
7
T
o
p
o
f
F
e
n
c
e
=
5
6
.
6
5
6
0
.
5
1
F
L
6
1
.
1
1
F
L
D
P
D
P
D
P
D
P
6
0
.
5
9
I
C
6
0
.
1
6
I
C
T
o
p
o
f
W
a
ll=
6
2
.
6
4
T
o
p
o
f
W
a
ll=
6
2
.
4
7
G
G
G
G
I
L
=
6
9
.
8
7
M
H
I
L
=
7
0
.
1
1
M
H
G
G
G
G
G
G
M
H
C
L
=
7
1
.
5
1
C
L
=
6
5
.
2
5
C
L
=
6
9
.
8
2
C
L
=
7
2
.
9
3
C
L
=
7
2
.
3
9
W
M
C
L
=
7
2
.
9
8
C
L
=
7
2
.
8
8
C
L
=
7
2
.
7
5
C
L
=
7
2
.
8
0
C
L
=
7
2
.
9
1
C
L
=
7
1
.
5
7
C
L
=
7
1
.
5
9C
L
=
7
1
.
5
6
C
L
=
7
1
.
5
2
C
L
=
7
1
.
5
8
C
L
=
7
1
.
4
7
C
L
=
7
1
.
6
1
C
L
=
7
1
.
7
0
C
L
=
7
0
.
7
3
C
L
=
7
0
.
0
4
C
L
=
6
7
.
9
9
C
L
=
6
8
.
4
9
C
L
=
6
8
.
2
9
C
L
=
6
8
.
4
5
C
L
=
6
4
.
0
4
C
L
=
6
3
.
3
5
C
L
=
6
4
.
1
3
C
L
=
6
4
.
5
0
I
L
=
6
3
.
0
1
I
L
=
6
3
.
0
1
C
L
=
6
5
.
4
2
C
L
=
6
5
.
0
8
U
t
ilit
y
C
o
v
e
r
I
L
=
6
3
.
3
4
C
L
=
6
5
.
7
7
C
L
=
6
2
.
1
1
C
L
=
5
9
.
4
8
C
L
=
5
9
.
6
1
C
L
=
5
9
.
2
7
C
L
=
6
1
.
5
4
C
L
=
5
9
.
4
0
C
L
=
5
7
.
1
7
C
L
=
5
9
.
5
1
C
L
=
5
9
.
0
0
C
L
=
5
8
.
8
2
M
H
I
L
=
5
6
.
7
8
C
L
=
5
8
.
5
8
C
L
=
5
8
.
9
8
C
L
=
5
7
.
5
3
C
L
=
5
8
.
2
6
C
L
=
5
6
.
9
6
C
L
=
5
6
.
9
8
C
L
=
5
7
.
0
2
C
L
=
5
7
.
1
4
C
L
=
5
7
.
3
5
C
L
=
5
7
.
3
5
C
L
=
5
6
.
5
2
C
L
=
5
5
.
5
8
C
L
=
5
6
.
0
4
C
L
=
5
4
.
5
1
C
L
=
5
4
.
6
7
C
L
=
5
4
.
4
9
C
L
=
5
5
.
2
8
Disabled
34
37
38
39
12
3 45
6
7 8
9
10
12
13
14
17
1819
2021
22
2324
2526 27
323335
51
525354
11
1516
3436
35
36
55
28
2930
31
3738
39
4041
42
4344
45
464748
49
50
Disabled
56
99
76
5
43
2
1
10
11
12
BANBRIDGE TOWN CENTRE PUBLIC REALM - DRAFT PROPOSALS BRIDGE STREET -
Stakeholder Consultation
New plaza created at Scarva Street / Downshire
Place incorporating; Imaginative play, hopscotch
paving pattern, feature seating, feature lighting
columns, new event infrastructure (pop-up power
supplies), cycle rack, on street water re-fill.
Victoria Street - Potential Options
Option 1
Retain street as two-way street with entrance into car park
only. NO exit from car park into Victoria Street
Option 2
Change street to one-way only as access into car park,
with exit via car park into Downshire Road.
DfI Roads improvement
scheme (2020) to Scarva
Street / Downshire Place
and Commercial Road
junction
Scarva Street parking
bays surfaced in natural
stone paving
Vehicle access defined
by contrasting coloured
natural stone paving
Bespoke lighting
enhancement – inclusion
of spot lighting to
buildings, string lighting
above street
Potential to improve
pedestrian circulation
Improve appearance of
railings on Downshire
Bridge
Potential to improve
pedestrian circulation
Potential to replace existing
railings at entrance to The Cut.
Railings to reflect historical theme
– e.g. horse drawn carriage,
horse shoe
Disabled bay locations retained
at service locations e.g. Banks
Public realm surfaced in
natural stone paving
Vehicle access defined by
contrasting coloured paving
Parking bay lengths
standardised to 5.8m / 6.0m
long bays throughout
New car park entrance
feature and car park
access opened up to
increase use from Bridge
Street.
Opportunity to create
multi-functional plaza space
with seating, tree planting (fixed
/ movable), wayfinding signage
and natural stone paving
with improved connectivity to
Downshire Place car park
Introduction of railway theme
through natural stone paving.
Incorporation of raised beds,
seating, wayfinding signage
and improved lighting for safety.
Improve boundary
treatment to car park -
replace existing timber
fencing
Improved pedestrian
access - incorporating
gateway feature
Retain and incorporate existing
trees and vegetation within
design – e.g. canopy raising,
clipping back overgrown shrubs
Resurface footpaths in natural
stone improving pedestrian
connection to car park
Potential to create plaza
space to frontage of listed
buildings
Improve visual aesthetics of
existing railings on Bann Bridge
Opportunities Created
· Improve visual aesthetics of railings to Bann Bridge
and Downshire Bridge and create features in town
centre
· Creation of new multifunctional space – incorporating
imaginative play designed in paving and removable
play structure
· Celebration of heritage - e.g. Railway theme in
Downshire linkages
· Enhancement of streetscape with additional tree
planting
· De-cluttering of streetscape with street lighting
columns in central reservation to improve pedestrian
movement
· Retain and enhance existing crossings
· Parking bays compliant with DfI Roads requirements
Tree lined feature retained
and strengthened with new
trees where required
Illustrations of potential options for new plaza at Scarva Street junction -
new tree planting, imaginative play, feature lighting columns, seating and
illuminated seating
Image of high quality natural stone paving (Sandstone) to
footways and vehicle access
Image of new street tree
planting in central
reservation
Potential location for feature
lighting as 'Gateway' into
Banbridge town centre
Potential gateway
feature lighting proposed
at Bann Bridge
Potential linkage improvements - eg
pedestrian link to Downshire Place
Image of multi-functional public realm
space
Access steps improved
(Section 75 feedback)
Downshire Linkages