2.1.

Conversion from Digital Counts to Energy

For thermal analysis, film ODs are converted to physical units using a HurterDriffield (HD) curve.⁴ HD curves are determined from films with recorded step wedges. Typically, a 21 step wedge is used in OD increments of 0.15.⁵ However, not all nuclear fireball films have intact step wedges, i.e., step wedges still present in the stored film negative. For films without step wedges, an approximation based on the response of identical film types was developed. For the MF films analyzed in this research effort, a sixth-degree polynomial fit was used as the HD curve:

2.2.

Real-World Time Alignment

Due to the mechanical nature of film recordings and the technology available at the time, nuclear testing films used highly calibrated timing circuits that flashed timing marks into films at a precise rate. The high-speed mechanical cameras used during the U.S. atmospheric nuclear tests had a nominal frame rate of up to 2500 fps;⁶ however, the frame rate could differ by as much as 50% of this nominal value.^1,2 Timing marks are used to determine accurate frame rates and derived the true time within a film series. Timing mark analysis is conducted for each film in order to time align multiple cameras.

2.3.

Power Temperature Derivation

For the purposes of this report, power temperature is defined as the temperature at which a Planck radiator most accurately matches the radiance observed by a calorimeter or film data with an assumed emissivity of 1. The radiance [$L(\mathrm{erg}/\mathrm{s}\text{-}{\mathrm{cm}}^2\text{-}\mathrm{str})$] of a Planck radiator is given by

The irradiance [$E(\mathrm{erg}/\mathrm{s}\text{-}{\mathrm{cm}}^2)$] of the fireball is measured directly from the detector (film) using

Radiance of the nuclear fireball was then calculated using the equation⁸

This calculated radiance is then compared to the numerical results to solve for temperature by integrating Planck’s equation between $\lambda 1$ and $\lambda 2$ for every pixel in the fireball region. The region of the film deemed the fireball region is determined by setting a threshold on digital counts within each frame. Each frame is analyzed with an adjusted threshold value to differentiate fireball from nonfireball areas. An example of this threshold is shown in Fig. 2.

Fig. 2

Example of applying an intensity threshold to an image to define the fireball region of a nuclear detonation.

This technique is used to mask the fireball region in order to convert this two-dimensional solution to an average one-dimensional solution for comparison to historical results. The conversion to $\text{watts}/{\mathrm{m}}^2$ from OD has an increased level of uncertainty at higher OD levels, defined here as levels $>2.5$ OD. In order to account for this greater level of uncertainty at the higher OD levels, a weighted mean is determined from the multiple films viewing the same event. The nonlinearity factor, $F$, is quantitatively defined as an average for the fireball region with OD $>2.5$ as

Another issue in data analysis is over exposure in the film base. Although many times these data will be discarded in a weighted mean based upon the nonlinearity factor, there are times when the fireball region itself does not have a high OD, but the rest of the frame does. These overexposed data are suspect and should not be included in this thermal analysis. Oversaturation is determined within a film by sampling nonfireball frames or regions to determine if background levels greatly exceed nominal values (0.75 OD). Oversaturation of particular films likely was the result of nonstandardized film development procedures employed in the rush to get certain films developed soon after the atmospheric tests.

3.1.

Power Temperature Results

Using the process outlined in the preceding section, two-dimensional temperature was determined for the test shots Wasp Prime and Tesla. A mean temperature was then determined as a function of time for each film. Figures 3 and 4 show the mean temperatures from film compared to the recorded calorimeter temperatures.⁹ Two-dimensional temperature plots for $T_{\min }$ and $T_{\max }$ for the tests Tesla and Wasp Prime are included in the Appendix. Uncertainty was estimated from the historical calorimeter temperatures to be $\pm 15\%$⁹ based upon variances in temperature for the same test shot.⁹ Uncertainty of the digitized films was estimated to be $\pm 15\%$ based upon possible changes in the assumed initial value of the HD curve. As can be seen in Figs. 3 and 4, temperature determined using the digitized films agrees within uncertainty to that of the historic calorimeter data as well as demonstrates the behavior of theoretical predictions.^12–14 In particular, the sharp decrease from initial $T_{\max }$, presence of a $T_{\min }$ between 3000 and 5000 K, and a relatively long rise and fall of the second $T_{\max }$, matches well with these predictions.

Fig. 3

Power temperature for event Wasp Prime.

Fig. 4

Power temperature for event Tesla.

3.2.

Thermal Yield Calculation

Thermal yield values were determined using this two-dimensional temperature solution. The thermal yield of the event was determined using the equation¹⁵

Utilizing this approach, Wasp Prime was determined to have a thermal yield of 1.4 kt. The historical quoted value of the thermal yield of Wasp Prime is 1.6 kt.⁹ Tesla was determined to have a thermal yield of 2.6 kt. The historical quoted thermal yield of Tesla is 2.5 kt.⁹ Both results agree well with historical values and provide further supporting evidence that temperature calculations determined by the two-dimensional power method are consistent with historical data.

4.1.

Verification of Results Using Digital Imaging and Remote Sensing Image Generation

The two-dimensional temperature algorithm was verified to be self-consistent by analyzing results from the Monte Carlo multibounce photon model, known as the digital imaging and remote sensing image generation (DIRSIG) model.¹⁶ Photon paths are transmitted from modeled sources, through a generated scene, with atmospheric transmission modeled in MODTRAN.¹⁷ The model accounts for the physical processes that take place during the transport from the source to an electro-optical sensor. This sensor can be modified by the user to emulate detectors used in the real world, such as historic cameras used for atmospheric nuclear testing.¹⁸

A Nevada National Security Site scene was generated within DIRSIG by using elevation data from the U.S. Geological Survey National Elevation Datasheet. These data were sampled over a 5 km by 5 km area of land at the Nevada National Security Site, Site 7, which was the location of the Operation Teapot event Wasp Prime. This surface was then overlaid with a texture map from Google Earth high-resolution imagery.¹⁸ This imagery was also used to segment the terrain into similar color sections. These color sections were then used to apply similar material definitions for reflectivity. The reflectance data for these materials were obtained from NASA’s airborne visual/infrared imaging spectrometer.¹⁸ The results of this scene generation, Fig. 5, is a generated image simulating what a modeled historic camera would view (on a logarithmic brightness scale) for one frame at its historic location for Wasp Prime.

Fig. 5

Screen capture of Wasp Prime detonation at site 7 Nevada National Security Site as viewed from a historic camera trailer location.¹⁸

Self-consistency was demonstrated by placing the radius from a single camera and power temperature from a single pixel into the DIRSIG model to produce images at every corresponding frame of the film. These images were then analyzed using the power temperature procedure to determine a new temperature solved at each pixel location. The results of this consistency check are shown in Fig. 6. The temperature determined from the film analysis results for this camera agrees within the uncertainty with the DIRSIG model. The DIRSIG and film data appear to track as a percentage of error relatively consistently throughout the film sequence. There are a few data points near temperature minimum that at early times have good agreement. This is primarily caused by a minimum in uncertainty from DIRSIG at these times. Provided a constant amount of tracked photons, a lower temperature results in better statistics and, thus, better agreement.

Fig. 6

Temperature determined from Wasp Prime single camera and single pixel. The temperature from digital imaging and remote sensing image generation (DIRSIG) was determined by generating image from input in DIRSIG model and rerunning temperature calculation.¹⁸

4.2.

Validation of Results Using Heat Flux Method

Temperature results were also validated based upon a one-dimensional comparison to the heat flux temperature method. The heat flux method determines temperature by measuring the energy transfer of one surface (nuclear fireball) to another (air). The effective time-dependent fireball surface temperature can then be determined using the equation¹⁹

Figure 7 shows the comparison of the heat flux method to that of the mean two-dimensional power temperature method for the event Wasp Prime. As shown in Fig. 7, the heat flux method and power temperature method are in close agreement.

Fig. 7

Heat flux method and power temperature method for Wasp Prime.

4.3.

Limitations of Results

Validation and verification analysis demonstrated that the power temperature derived for the two nuclear testing films investigated in this article is reliable to within $\pm 15\%$. The primary limitation in this approach is the inability to derive an original temperature value without a historical reference. Equation (2) was used to derive irradiance values from OD. However, the energy flux received by the first step in the step wedge is unknown. For this work, it was assumed to be $1\mathrm{erg}/{\mathrm{cm}}^2$. This value was later verified through agreement with the heat flux method, which relies upon an accurate historical assessment of thermal yield. If this data point was actually $0.5\mathrm{erg}/{\mathrm{cm}}^2$, a significant variance (50%) between the power and heat flux temperature techniques would exist. Even a slight modification, such as using an energy flux of $0.9\mathrm{erg}/{\mathrm{cm}}^2$, results in noticeable differences between the two techniques, which should, in theory, agree exactly. Because of this, the quoted uncertainty of $\pm 15\%$ was approximated as the maximum possible variance before the authors would have considered failure of the validation steps.

Although limitations exist, multidimensional thermal analysis of nuclear events using digitized scientific films has applications to multiple fields. This is particularly true for the astrophysics community whose investigation into solar physics has a number of similarities to early nuclear fireball dynamics. The continuation of this work is to expand this multidimensional analysis from a two-dimensional temperature solution into a three-dimensional one, relying upon advances in computer vision to reconstruct a time-varying dynamic source. Additionally, noticeable temperature gradients known as limb darkening can be observed on all two-dimensional temperature plots. Limb darkening measurements can be used to determine the temperature profile of the nuclear fireball.