Hydraulic needle valve
Flow Control Valves
The Needle Valve block models a variable orifice created by a conical needle and a round sharp-edged orifice in thin material.
The flow rate through the valve is proportional to the valve opening and to the pressure differential across the valve. The flow rate is determined according to the following equations:
|pA, pB||Gauge pressures at the block terminals|
|CD||Flow discharge coefficient|
|A(h)||Instantaneous orifice passage area|
|x||Needle displacement from initial position|
|hmax||Maximum needle stroke|
|Aleak||Closed valve leakage area|
|Amax||Maximum valve open area|
|pcr||Minimum pressure for turbulent flow|
The minimum pressure for turbulent flow, pcr, is calculated according to the laminar transition specification method:
By pressure ratio — The transition from laminar to turbulent regime is defined by the following equations:
pcr = (pavg + patm)(1 – Blam)
pavg = (pA + pB)/2
|pavg||Average pressure between the block terminals|
|patm||Atmospheric pressure, 101325 Pa|
|Blam||Pressure ratio at the transition between laminar and turbulent regimes (Laminar flow pressure ratio parameter value)|
By Reynolds number — The transition from laminar to turbulent regime is defined by the following equations:
|DH||Valve instantaneous hydraulic diameter|
|ν||Fluid kinematic viscosity|
|Recr||Critical Reynolds number (Critical Reynolds number parameter value)|
The block positive direction is from port A to port B. This means that
the flow rate is positive if it flows from A to B and the pressure differential is
determined as . Positive signal at the physical signal port
opens the valve.
Fluid inertia is not taken into account.
The flow passage area is assumed to be equal to the frustum side surface area.
The diameter of the orifice of the valve. The default value is
The angle of the valve conical needle. The parameter value must be in the
range between 0 and 180 degrees. The default value is
The initial opening of the valve. You can specify both positive and
negative values. The default value is
Semi-empirical parameter for valve capacity characterization. Its value
depends on the geometrical properties of the orifice, and usually is
provided in textbooks or manufacturer data sheets. The default value is
Select how the block transitions between the laminar and turbulent regimes:
Pressure ratio — The transition
from laminar to turbulent regime is smooth and depends on the value
of the Laminar flow pressure ratio parameter.
This method provides better simulation robustness.
Reynolds number — The transition
from laminar to turbulent regime is assumed to take place when the
Reynolds number reaches the value specified by the
Critical Reynolds number parameter.
Pressure ratio at which the flow transitions between laminar and turbulent
regimes. The default value is
0.999. This parameter is
visible only if the Laminar transition specification
parameter is set to
The maximum Reynolds number for laminar flow. The value of the parameter
depends on the orifice geometrical profile. You can find recommendations on
the parameter value in hydraulics textbooks. The default value is
10. This parameter is visible only if the
Laminar transition specification parameter is set
The total area of possible leaks in the completely closed valve. The main
purpose of the parameter is to maintain numerical integrity of the circuit
by preventing a portion of the system from getting isolated after the valve
is completely closed. The parameter value must be greater than 0. The
default value is
Parameters determined by the type of working fluid:
Fluid kinematic viscosity
The block has the following ports:
Hydraulic conserving port associated with the valve inlet.
Hydraulic conserving port associated with the valve outlet.
Physical signal port to control spool displacement.