The data used was collected in version 0.2.2800. It was obtained with regular furnaces only, the advanced furnace is untested. If there is any difference between them, it would probably be the internal volume, the regular furnace holds 1000 L.

Furnace behaviour

• Only the gas inside the furnace have temperature, the furnace itself does not and absorbs no heat
• Combustion will consume 95% of the limiting ingredient, O2 or H2 (if there is 10 mol O2, and excess H2, 0.5 mol O2 will remain afterwards)
• For a combustion to occur, there must be at least 5% of either O2 or H2
• Reaction formula: 1 O2 + 2 H2 -> 6 CO2 + 3 X + 595kJ
• No side reactions with other gases have been observed so far
• The inlet pipe will only allow gas to enter the furnace, it will only do so if the pressure in the pipe is higher than the pressure inside the furnace.
• The outlet pipe will allow gas to pass both ways, the direction depends on the pressure in the pipe and in the furnace. So it can be used as an alternative inlet point.

Using perfect 2:1 fuel

Temperature peak

• T(after) = (T(before) * 61.9 + 0.95 * 595000) / (243.6 * 0.95 + 61.9 * 0.05)
  • Temperature in Kelvin (Celsius + 273)
  • 61.9 = heat capacity before combustion (based on reaction formula, so 3 moles total) = sum(specific heat * moles of each gas before) = 21.1 + 2*20.4
  • 243.6 = heat capcity for gas after combustion = sum(specific heat * moles of each gas after) = 0.05*(21.1 + 2*20.4) + 0.95*(6*28.2 + 3*24.8)
  • 0.95 and 0.05 refers to the 95% combustion efficiency
• The number of moles combusted doesn't matter under perfect conditions, the temperature increase is the same since the reagent/product ratio determines this outcome. The number of moles will however effect how quickly the gas cools.

Pressure peak

• P = nRT/V
  • n = total moles
  • R = 8314
  • V = 1000
• P (before) = n(before) * 8314 * T(before) / 1000
• P (after) = n(before) * (0.05*1 + 0.05*2 + 0.95*6 + 0.95*3) / (1 + 2) * 8314 * T(after) / 1000

Using diluted fuel

Unreactive gases can be added before the ignition to increase pressure and decrease temperature. An excess of either O2 or H2 also counts as unreactive. The outcome can be calculated like this.

Temperature peak

1. O2 moles reacted = min(moles O2, moles H2 * 0.5) * 0.95
2. released energy = O2 moles reacted * 595000
3. heat capacity (before) = sum(specific heat * moles of each gas (before))
4. heat capacity (after) = heat capacity (before) + O2 moles reacted * 181.7†
5. thermal energy (before) = temp (before) * heat capacity (before)
6. thermal energy (after) = thermal energy (before) + released energy
7. temperature (after) = thermal energy (after) / heat capacity (after)

† 181.7 comes from 243.6 - 61.9 (the change in the heat capacity for the gas before and after combustion, see above)

Pressure peak

1. total moles (before) = pressure(Pa) * 1000 / (8314 * Temp (before)
2. total moles (after) = total moles (before) + O2 moles reacted * 6†
3. Pressure (after) = total moles (after) * 8314 * Temperature (after) / 1000

†6 comes from 9 - 3, combustion consumes 3 moles and produces 9 moles

Using Ice(Oxite) and Ice(Volatiles)

There is a minor difference between which ice is added first. One can also observe a fluctuation in the combustion efficiency compared to when a furnace is fueled with gas. The end result also matters a little bit on how fast the ignition button is pressed when the first ice type is added while doing larger batches.

small batch, oxite first

• Adding 1 oxite + 1 volatile, in that order
  • Temperature: 2222K, Pressure: 2.03MPa, moles of O2/H2 combusted: 11/21, Combustion ratio (H2): 95%
• Adding 1 oxite + 2 volatiles, in that order
  • Temperature: 2514K, Pressure: 4.13MPa, moles of O2/H2 combusted: 22/43, Combustion ratio (H2): 98%

small batch, volatiles first

• Adding 1 volatile + 1 oxite, in that order
  • Temperature: 2224K, Pressure: 2.03MPa, moles of O2/H2 combusted: 11/21, Combustion ratio (H2): 95%
• Adding 2 volatiles + 1 oxite, in that order
  • Temperature: 2432K, Pressure: 3.93MPa, moles of O2/H2 combusted: 21/42, Combustion ratio (H2): 95%

large batch, oxite first

• Adding 5 oxite + 10 volatiles, in that order
  • Temperature: 2463K, Pressure: 18.76MPa, moles of O2/H2 combusted: 96/190, Combustion ratio (H2): 86%
• Adding 8 oxite + 16 volatiles, in that order
  • Temperature: 2537K, Pressure: 33.28MPa, moles of O2/H2 combusted: 172/344, Combustion ratio (H2): 98%

The difference in combustion efficiency is a mystery. Fuel temperature doesn't seem to matter (seen by furnace tests with 2:1 gas on both Mars and Europa). One possibility is that this deviation is a result of multiple consecutive ignitions. Whatever the reason, using ice in a furnace creates some unpredictability.

Furnace cooling rate

unknown

Observations

• the rate of cooling is temperature dependent, hotter cools faster (furnace temp - surrounding temp? how do vaccum behave?)
• the rate of cooling is time dependent (game tick speed is once per 0.5 seconds)
• the rate of cooling is mol dependent (small amounts cool faster, appears to be a linear correlation)
• adding ores decreases the temperature (do melting cost energy? or is this just from heating the trapped gases inside the ore?)

Possible experimental setup to measure dT/dt

• Hold a tablet with an atmos cartridge in the right hand (so it can be read when the game is paused). Aim the tablet against the furnace and pause with ESC, double tap ESC to move the game forward one tick, record the temperatures.
• Remember to record the total amount of moles as well

Resetting the furnace

Since only gas have temperature, evacuating all gas means resetting the temperature

Calculating how to reach a desired Temperature and Pressure on ignition

To freely control the temperature and pressure, the fuel must be diluted with a non-combustable gas. This can be added either before or after ignition, doing so before ignition makes it alot easier to predict, since doing so after ignition is more of an art than a science. The method prefered here is to add the non-combustable gas before ignition. It is possible to add gas into the furnace via the exhaust pipe, so it's not necessary to dilute the fuel inside the fuelpipes to do this.

There are only 4 variables required for this calculation.

1. Intial fuel mix temperature (furnace temperature before ignition)
2. Desired temperature on ignition (you choose)
3. Desired pressure on ignition (you choose)
4. The specific heat value of the gas used to dilute the fuel (if a mix of gases is used, the specific heat to use is the average specific heat per mol, example calculation below)

The equations will give these results

1. The ratio(fuel) in the fuel-dilutant mix. (0.75 means 75% perfect 1:2 fuel mols (O2 and H2 added together)†, the other 25% will be dilutant gas mols, making it a 1:2:1 mix of O2:H2:dilutant)
2. The total pressure of the fuel-dilutant mix inside the furnace before ignition

†It's important to separate out the fuel part like this to allow an excess of either O2 or H2 to be the dilutant gas if so desired

Diluting the fuel correctly isn't hard, but if there are issues one can easily double check if the mix is correct by using the tablet and looking at the mol% values for the fuel mix. The fuel ratio calculated with the big equation below uses the sum of the moles in the fuel, to get the individual ratios for O2 and H2, they must calculated separately.

Calculating the fuel ratio

• ratio(fuel) = n(fuel)/(n(fuel)+n(dilutant)) = s*(T(after) - T(before)) / ( T(before)*(61.9/3-s) + (0.95*595000/3) - T(after)*(61.9-s) - T(after)*(0.95*181.7/3) )
  • s = specific heat of diluting gas
    • if the dilutant is a mix of gases, calculate the average specific heat in the mix per mol
    • example: 8 mol N2 and 17 mol CO2 as dilutant -> specific heat = (8*20.6 + 17*28.2) / (8+17) = 25.77
  • n(fuel) = total mols of fuel = n(O2)+n(H2) together (always in the perfect 1:2 ratio, if either O2 or H2 are in excess the extra amount is considered a dilutant)
  • n(dilutant) = total mols of non-combusting gas (this can be an excess of O2 or H2 if that is used as dilutant)
  • ratio(fuel), 1 = 100% fuel = 33.3% O2 and 66.7% H2, no dilutant present

Calculating the pressure before ignition

• P(before) = P(after)*R*T(before) / ( R*T(after) * (1 + ratio(fuel)*2*0.95) )
  • r(fuel) is the result from the temperature calculation above
  • R = 8314
  • P(after) = desired value, in Pa
  • T(before) = temperature of fuel mix in the furnace before ignition
  • T(after) = the chosen value used in the temperature calculation above

Diluting the fuel inside the furnace

Mixing gas is temperature sensitive. This is because pressure is used as an indirect measure of the amount of mols (n=PV/(RT)). But when the temperatures are different, this is no longer the case. It is however possible to get around this issue with a bit of math.

Same temperature of fuel and dilutant

• First add the fuel to an empty furnace
  • fuel pressure in furnace = ratio(fuel) * P(before)
• Then add the dilutant via the exhaust pipe until the pressure inside the furnace reaches P(before) (if the fuel pipe is re-used, remeber to flush the remaining fuel before adding the dilutant)

Different temperature of fuel and dilutant

• use Kelvin for temperature
• Thermal energy of gas mix per mol = sum(temperature (before mixing) * specific heat (each gas) * mol ratio (after mixing for each gas))
• specific heat of gas mix per mol = sum(specific heat (each gas) * mol ratio (after mixing for each gas))
• Temperature after mixing = Thermal energy of gas mix per mol / specific heat of gas mix per mol
• Calculate ratio(fuel) and P(before) based on Temperature after mixing
• When adding the fuel, the temperature difference must be compensated for
  • fuel pressure in furnace = ratio(fuel) * P(before) * T(fuel) / (Temperature after mixing)
• Add dilutant through the exhaust pipe until the furnace pressure reaches P(before)
• The furnace temperature should now be the same as the calculated Temperature after mixing, unless there was warming or cooling of the gases during mixing

The correct fuel mix can be double checked with the following equations. Use the tablet and compare the mol% with these numbers.

• ratio(O2) = ratio(fuel)/3 (use this one when there is an excess of H2)
• ratio(H2) = ratio(fuel)*2/3 (use this one when there is an excess of O2)

Example calculation

It's a warm and sunny day on Europa and a stationeer wants to make some invar. The desired temperature and pressure will be chosen as be the upper limit for invar, so 1500K and 20MPa. Adding ore to the furnace will reduce its temperature and increase the amount of gas (and pressure) inside of it, but the stationeer is pretty sure that making just 100g of invar should be doable. The furnace is exposed to the atmosphere and will be loosing temperature and pressure fairly fast which could be an issue, but making the alloy should be quick enough. The dilutant gas will be pure O2 from the atmosphere, which has a specific heat value of 21.1. The starting temperature of the fuel and the atmosphere are both at -140°C.

• ratio(fuel) = s*(T(after) - T(before)) / ( T(before)*(61.9/3-s) + (0.95*595000/3) - T(after)*(61.9-s) - T(after)*(0.95*181.7/3) )
  • s = specific heat of the dilutant = 21.1
  • T(after) = 1500K (this is the chosen value)
  • T(before) = -140C = 133K (temperature inside the furnace before ignition)
• ratio(fuel) = 0.281

The necessary pressure of the pre-ignition fuel mix inside the furnace will be

• P(before) = P(after)*R*T(before) / ( R*T(after) * (1 + ratio(fuel)*2*0.95) )
  • ratio(fuel) = 0.281
  • P(after) = 20MPa (this is the chosen value)
  • T(before) = -140C = 133K
  • T(after) = 1500K (this is the chosen value used in the temperature calculation)
• P(before) = 1156.5kPa

Dilution calculations

• The needed pressure of pure fuel inside the furnace will be
  • P(fuel) = ratio(fuel) * P(before) = 0.281 * 1156.6kPa = 325kPa
  • The dilutant will then be added to the furnace to reach the P(before) pressure at 1.16MPa
• If everything was done correctly, the ratio of H2 inside the furnace before ignition can be checked with the tablet, it should be
  • ratio(H2) = 0.281 * 2/3 = 0.187 = 19%

Making 100g of invar this way works. The added ores will reduce the temperature and increase the pressure a bit, pushing the pressure above 20MPa and out of the needed range. But after waiting for the pressure to drop back down, the temperature is still high enough to produce the desired alloy. Choosing 20MPa was clearly a bit of a mistake, but luckily 100g of metal was a small enough amount to make this work anyway.

Experiment used to determine the amount of released energy from combustion (so it can be verified)

1. Place a frame, build a furnace partially inside the frame, complete the frame. The furnace is now perfectly insulated and will no longer loose temperature (unless ore is added) nor explode from high pressure
2. Add fuel (2:1 not required) via a pipe, use over 1000 mol of O2, remove the pipe attached to the furnace
3. Record all mol amounts and temp with a tablet (atmos cartridge), convert temp to K (add +273)
4. Ignite furnace, record all mol amounts and temp with tablet, convert temp to K
5. Calculate moles of combusted O2 (= moles before - moles after)
6. Calculate the Thermal energy in the gas, before and after (Thermal energy = Temp * sum(mol of each gas * specific heat)
7. Calculate energy released per mol of combusted O2 (= TE.after - TE.before) / moles of combusted O2)
8. Deconstruct the furnace completely to disarm it safely, or connect a single pipe so it can burst and act as a vent
9. Alternatively: A circuit can probably also be used to capture the temperature and pressure at the point of ignition