ONCE IN WAITEMATA AD1 Studio Project Daniel Yang
the shape of a Pikorua echoes connection and inďŹ nity. Maori believed in the concept of “ intertwining the rope as outsiders come in Auckland.
connecting the three nodes with continuous linear pattern of decking
Geometry and f
a
a. at strip of the loop, enables west-east traďŹƒc. * Note: all pedestrian slope gradient are controled within 8 degree by BC.
Planting Pop-up shops (mobility location)
A-03 1:500
seats
LOWER QUEEN STREET
QUAY STREET
ALBERT STREET
A-01
A-02
Site/Promenade Plan 1:1000 @A4
CUSTOM STREET
plants
inatable pop-ups
seats
Promenade Programme Index 1:1000 @A3
a
a. at strip of the loop, enables west-east traďŹƒc. * Note: all pedestrian slope gradient are controled within 8 degree by BC.
Planting Pop-up shops (mobility location) seats
A-01 1:500
a
a. at strip of the loop, enables west-east traďŹƒc. * Note: all pedestrian slope gradient are controled within 8 degree by BC.
Planting Pop-up shops (mobility location)
A-03 1:500
seats
LOWER QUEEN STREET
ALBERT STREET
b c
f
a
e d g
a. entrance from transport centre underpass. b. “Maori warrior” Sculpture by Molly Macalister on water c. indoor public cinema d. WC e. Gallery, piano island f. open space to accomodate pop up shops Underground Level Plan, 1:1000@ A4
polycarbonate roof, crystal clear, Joinery Detail J2
475mm enginnered glulam @ 2500mm ctrs, dressed smooth silky ďŹ nish
internal downpipe coll from from polycarbona
SECTION AA 1:250@ A1 1:500@A3
475mm enginnered glulam @ 2500mm ctrs, dressed smooth silky ďŹ nish
38250mm
polycarbonate roof, crystal clear, Joinery Detail J2
detail J1
engineered steel bridge
internal downpipe collection water from from polycarbonate rooďŹ ng
Initially the popups were designed to be linear, owing along with the paving.
However, spherical inatable structure allow more possibility and resilience.
Construction Method
Initially the popups were designed to be linear, owing along with the paving.
However, spherical inatable structure allow more possibility and resilience.
Geometry and form