2.2.1.

Isotropic probe for in situ fluence rate measurements

Small fiber optic isotropic probes, similar to those previously described by Bays, ²¹ were developed [Fig. 1a ]. A $250\text{-}\mathrm{\mu }\mathrm{m}$ ruby sphere (Sandoz fils SA, Cugy, Switzerland), which is fluorescent under $632\text{-}\mathrm{nm}$ light, was glued to a $400\mathrm{\mu }\mathrm{m}∕$ numerical aperture (NA) 0.37 bare flat-end quartz fiber (Biolitec AG, Jena, Germany) with a UV curable adhesive (Loctite 350, Loctite, Dublin, Ireland). The fiber was covered with thin black polyester tubing (018050 BST, Advanced Polymers Inc., Salem, New Hampshire). Fluorescence from the ruby sphere collected by the fiber was measured with a CCD spectrometer (S2000, OceanOptics Inc., Orlando, Florida) equipped with a $665\text{-}\mathrm{nm}$ long-pass filter. A linear combination of the ruby fluorescence spectrum and a third-degree background function, weighted by the spectral response of the system, was fitted to each observed spectrum to quantify the ruby fluorescence and hence the fluence rate. Calibration was done with a setup similar to that described by Marijnissen and Star,²⁶ with a flat photodiode (S2387-33R, Hamamatsu, Japan) positioned next to the probe in uniform isotropic $632\text{-}\mathrm{nm}$ light inside an integrating sphere (Avasphere-50-IRRAD-S, Avantes, Eerbeek, Netherlands) coupled to a diode laser (CeramOptec, Bonn, Germany). The sphere was filled with a 23% sucrose/water solution with a refractive index of 1.37. The spectral response and active area of the photodiode was measured in a National Physical Laboratory (Middlesex, United Kingdom) traceable setup by the Norwegian Metrology Service (Kjeller, Norway), and was corrected for the effects of reflection by the window material $(+1.7\%)$ and of measured deviation from the ideal cosine angular response $(+1.0\%)$ .

Fig. 1

Image of (a) the fluorescent isotropic probe used for fluence rate measurements and (b) the thermocouple probe used for temperature measurements.

2.2.2.

In vivo measurements of intracranial fluence rate distribution

A plastic template with parallel channels, fitting the light delivery and probe fibers, was used together with a stereotactic frame to control the fiber positions with $0.1\text{-}\mathrm{mm}$ precision. The setup is shown in Fig. 2 . Anesthetized animals were fixed in the stereotactic frame, the skin was incised, and the frame was used to position the template with the source fiber channel $3\mathrm{mm}$ posterior to and $2\mathrm{mm}$ to the right of the bregma. The template was then fixed to the skull using dental cement (Fuji plus, GC, Tokyo, Japan), and the skin closed around the template with sutures to prevent local hypothermia. Holes were drilled through the template channels and into the skull. The light delivery fiber was then inserted into the brain and fixed in the template with histoacryl adhesive (Braun, Melsungen, Germany). The fiber tip delivered $632\text{-}\mathrm{nm}$ light from the diode laser at a radiant power of $15\mathrm{mW}$ . Initial tests of light transmission from the fiber into whole blood and rat brain showed that this radiant power was at least four and seven times, respectively, below the thresholds for heat-induced coagulation. The fluence rate probe was mounted in the stereotactic frame’s electrode holder and inserted through the template to record fluence rates along four parallel tracks positioned 2 or $4\mathrm{mm}$ in front of and behind the light delivery fiber, as shown in Fig. 2. Fluence rates were measured at $0.5\text{-}\mathrm{mm}$ increments as the probe was moved into the brain, starting with the tracks $4\mathrm{mm}$ from the source. The procedure lasted 1 to $2\mathrm{h}$ , which is comparable to the duration of light exposures in our PDT protocols using BDIX rats.⁴

Fig. 2

Setup for the in vivo fluence rate measurements. The measurement tracks were positioned within one sagittal plane through the rat brain.

It was recognized that the probe’s black polyester tubing [Fig. 1a] could act as a photon sink, resulting in a reduction in the measured signal. To estimate the extent of this perturbation, Monte Carlo simulations were performed for the relevant probe geometry, light penetration depths, and fluence rate gradients. The results show that the black cladding reduces the measured signal by 3 to 25% depending on the fluence rate gradient along the long axis of the probe. These results were used to calculate a general correction factor that was a function of the logarithmic local fluence rate gradient. The maximum correction (corresponding to 25% loss) occurred at the positions where the fluence rate at the cladding was largest compared to the fluence rate at the sphere. For each measurement, the local gradient was estimated using the ratio to the previous measurement in the same measurement series. All measurements were subsequently corrected using their resulting correction factors. The calculation of the corrected fluence rate $\varphi$ can be summarized as

2.2.3.

Diffusion models of the fluence rate distribution

According to diffusion theory, the fluence rate $\varphi$ at distance $r$ around an isotropic point source delivering a radiant power $P$ into an infinite turbid medium is approximated by²⁷

An anisotropic source can be approximated as an isotropic source displaced a distance $1∕({\mu }_s^{\prime }+{\mu }_a)$ along the direction of the emitted light.²⁹ In this manner, Eqs. 1, 3, for tumor-free and tumor-bearing animals, respectively, with $r$ replaced with the distance

2.2.4.

Monte Carlo model of the fluence rate distribution

A commonly used Monte Carlo code ^{3 30} was modified for the light delivery geometry in the animals. The fiber tip was modeled as a $400\text{-}\mathrm{\mu }\mathrm{m}$ disk emitting a conical photon beam of $\pm 9\mathrm{deg}$ , and the brain was considered to be an infinite medium with uniform scattering and absorption properties. Anisotropic scattering was modeled using a Henyey-Greenstein phase function with scattering anisotropy $\left(g\right)$ values of between 0.8 and 0.98, which is the range of values reported for tissues. ^{18, 19, 31, 32} Tumors were modeled as ellipsoids with varying scattering and absorption coefficients, and with their size and position determined from histological sections of brains from tumor-bearing animals. The Monte Carlo simulations were fit to measured fluence rates using an optimization algorithm that systematically varied the absorption and scattering coefficients to find the best least-squares estimate. About 500,000 runs, requiring $30\min$ on a $3.6\text{-}\mathrm{GHz}$ Pentium 4 processor, were necessary for each set of coefficients to achieve an accuracy of 2%.

2.3.1.

In vivo measurements of intracranial temperature distributions

Temperature measurements in tumor-free animals were accomplished by inserting thermocouples into the rat brain. The thermocouple probes are shown in Fig. 1b, and were assembled from K-type $75\text{-}\mathrm{\mu }\mathrm{m}$ wire thermocouples (CHAL-003, Omega Engineering, Stamford, Connecticut) mounted in $800\text{-}\mathrm{\mu }\mathrm{m}$ ceramic tubing (TRA-005132, Omega Engineering, Stamford, Connecticut). The probes were tested immersed in water under a laser beam to verify that direct light absorption in the thermocouple did not affect the readings. No noticeable increase related to direct absorption was observed for fluence rates below $0.25\mathrm{W}{\mathrm{cm}}^{-2}$ , and at $1.2\mathrm{W}{\mathrm{cm}}^{-2}$ , the increase was only $0.2\mathrm{K}$ . To account for subtle changes in body temperature, all measurements were normalized to rectal body temperature monitored with a $0.5\text{-}\mathrm{mm}$ insulated thermocouple. In the rat brain, positioning of the thermocouples with respect to the source fiber was accomplished in a similar manner as that described for the fluence rate measurements in Sec. 2.2.2. Two distinct data sets were collected from each animal: First, steady state temperatures elevated by the light delivery were measured at $0.5\text{-}\mathrm{mm}$ increments as the probe was moved into the brain. The temperature increase caused by light absorption was then estimated by subtracting steady state temperatures measured while no light was delivered from the fiber tip during the withdrawal of the temperature probe. Second, temporal measurements of temperature increase and decrease (as the laser light was switched on and off, respectively) were made during the withdrawal of the probe, with the probe fixed $2\mathrm{mm}$ lateral to the source fiber tip.

2.3.2.

Bioheat model of the temperature distribution

From the bioheat equation³³ and Eq. 1, the temperature increase $T$ in tissue around a point source is described by

3.1.1.

Measured fluence rates in the rat brain

Fluence rate measurements from four tumor-free rats are shown in Fig. 3a . (A preliminary analysis of the results from two of the rats was published in a previous report.³⁶) Inter- and intraanimal variation was of similar magnitude. As seen from the data series in the diagrams in Fig. 3, the measured fluence rates throughout the brains were consistent within a total variability of a factor of 2. There was relatively good agreement between diffusion theory [Eqs. 1, 2, 4] and the measured data. The best fit was found for ${\mu }_a=0.570{\mathrm{cm}}^{-1}$ (standard error $0.021{\mathrm{cm}}^{-1}$ ) and ${\mu }_s^{\prime }=27.9{\mathrm{cm}}^{-1}$ (standard error $2.4{\mathrm{cm}}^{-1}$ ), and is shown as solid lines in Fig. 3a. These values correspond to a light penetration depth of $0.143\mathrm{cm}$ [Eq. 2]. Measurements made closer than $2\mathrm{mm}$ from the skull were excluded from the analysis.

Fig. 3

Interstitial fluence rate $\varphi$ relative to radiant power $P$ plotted as a function of vertical distance $z$ and lateral distance $x$ from the source fiber tip. The geometry and coordinates are illustrated in Fig. 2. (a) Data from four tumor-free rats with the source fiber fixed 4 to $4.5\mathrm{mm}$ into the brain and (b) data from two tumor-bearing rats with the source fiber fixed $2\mathrm{mm}$ into the brain. Measurement series were recorded along tracks positioned parallel to the source fiber at $x=\pm 2\mathrm{mm}$ $(◻)$ and $x=\pm 4\mathrm{mm}$ $(엯)$ . The thick solid lines represent diffusion theory predictions [Eqs. 1 to 4] fitted to the measured fluence rates, omitting measurements made less than $2\mathrm{mm}$ from the skull. Correspondingly, the dotted lines are the best fit of the Monte Carlo model. The fluorescent probes were somewhat fragile, and therefore three measurement series in (a) and one (in part) in (b) are absent. The data in the diagrams are corrected using the method described in Sec. 2.2.2.

Results of measurements from two tumor-bearing rats with fibers positioned 1 to $2\mathrm{mm}$ above the tumor centers are shown in Fig. 3b. The recorded fluence rates were significantly lower than in the tumor-free brains, particularly in the area closest to the fiber tip where the values were reduced by a factor of 2. Furthermore, the light distribution was shifted about one millimeter away from the fiber tip (i.e., $z$ direction in Fig. 3), suggesting that the tumor tissue in front of the fiber tip had a lower scattering coefficient than normal brain. The diffusion theory model [Eq. 3], with tumor radius $R=2.5\mathrm{mm}$ and the already mentioned scattering and absorption coefficients from tumor-free animals, was fitted to the measured fluence rates. As we see in Fig. 3b there is good agreement between the model and the experimental data. The best fit was found for ${\mu }_{a,\mathrm{tumor}}=1.46{\mathrm{cm}}^{-1}$ (standard error $0.094{\mathrm{cm}}^{-1}$ ) and ${\mu }_{s,\mathrm{tumor}}^{\prime }=5.45{\mathrm{cm}}^{-1}$ (standard error $0.44{\mathrm{cm}}^{-1}$ ). This corresponds to a light penetration depth of $0.181\mathrm{cm}$ [Eq. 2].

3.1.2.

Fluence rates estimated by Monte Carlo simulation

As expected, in media where scattering dominates absorption, the distributions calculated by Monte Carlo simulation were closely related to the diffusion theory model. For tumor-free rat brain, the absorption and scattering coefficients yielding the best least-squares fit to the measured fluence rates did not deviate from the diffusion model estimates (i.e., the deviation was less than the 2% optimization accuracy described in Sec. 2.2.4). At positions along the measurement tracks (Fig. 2), the Monte Carlo model predicted fluence rates almost identical to diffusion theory. Likewise, as expected when diffusion theory is valid, variation of the scattering anisotropy had no significant effect. In general, major fluence rate discrepancies between Monte Carlo simulations and diffusion theory were seen exclusively at positions within $0.5\mathrm{mm}$ from the source fiber tip, where no experimental data were recorded.

More pronounced differences between the diffusion model and Monte Carlo simulations were observed in tumor-bearing animals. The tumor was modeled as a $6.5\times 4.5\text{-}\mathrm{mm}$ ellipsoid centered $1.5\mathrm{mm}$ below the fiber tip, embedded in normal brain with the scattering and absorption coefficients estimated from measurements in tumor-free animals. The best least-squares fit to the measured fluence rates was found for ${\mu }_{a,\mathrm{tumor}}=1.39{\mathrm{cm}}^{-1}$ and ${\mu }_{s,\mathrm{tumor}}^{\prime }=7.3{\mathrm{cm}}^{-1}$ , and is shown in Fig. 3b. These values deviate from the diffusion theory results already determined and correspond to a shorter light penetration depth of $0.166\mathrm{cm}$ . A map of the light distributions predicted by Monte Carlo simulation and diffusion theory for a given tumor shape and set of optical properties is shown in Fig. 4 . Such comparisons showed that, although the models yielded similar results in the normal brain at distances in excess of 3 to $4\mathrm{mm}$ from the fiber tip, the diffusion model overestimated the fluence rate in large parts of the tumor by 30 to $50\%$ compared to the Monte Carlo model. The scattering anisotropy did not have much effect on the Monte Carlo model. Variation of the anisotropy value $g$ within the range 0.8 and 0.99 shifted the isodose contours shown in Fig. 4 by less than $0.1\mathrm{mm}$ .

Fig. 4

Distribution of light in tumor-bearing rat brain. The contours show fluence rate $\varphi$ relative to the radiant power $P$ emitted from a bare fiber tip (unit: inverse centimeters squared). The solid lines are calculated by Monte Carlo simulations for an ellipsoid $4.5\times 6.5\text{-}\mathrm{mm}$ tumor geometry and optical properties ${\mu }_a=0.62{\mathrm{cm}}^{-1}$ , ${\mu }_s^{\prime }=31{\mathrm{cm}}^{-1}$ , ${\mu }_{a,\mathrm{tumor}}=1.6{\mathrm{cm}}^{-1}$ , ${\mu }_{s,\mathrm{tumor}}^{\prime }=7.7{\mathrm{cm}}^{-1}$ , and $g=0.90$ . The dotted lines are the corresponding contours according to the diffusion theory model [Eqs. 3, 4] with the same optical properties and the tumor approximated as a $2.5\text{-}\mathrm{mm}$ -radius sphere.

Monte Carlo simulations featuring 100% reflecting or absorbing surfaces at the positions of the skull were performed to investigate finite volume effects. As shown in Fig. 5 , the fluence rate at the measured positions was altered by less than 5% as long as sites closer than $2\mathrm{mm}$ to the surface were omitted. The skull and its surrounding soft tissues have optical properties of similar order of magnitude as the brain,¹⁸ and should represent far lower perturbations than the 100% reflecting or absorbing surfaces.

Fig. 5

Fluence rates calculated by the Monte Carlo model featuring worst-case finite volume effects. The lines represent 100% reflecting (—) and absorbing (- - -) surfaces added at $z=-4\mathrm{mm}$ to the geometry presented in Fig. 3. The dotted lines represent the ideal infinite geometry.