ENH integrate the kinetics figure
This commit is contained in:
parent
aaa251e253
commit
591b652890
142
tex/thesis.tex
142
tex/thesis.tex
|
|
@ -1255,6 +1255,32 @@ appeared that the \gls{mab} binding was quadratically related to biotin binding
|
|||
critical to controlling the amount and \glspl{mab} and thus the amount of signal
|
||||
the T cells receive downstream.
|
||||
|
||||
\begin{figure*}[ht!]
|
||||
\begingroup
|
||||
|
||||
\includegraphics{../figures/dms_qc.png}
|
||||
\phantomsubcaption\label{fig:dms_qc_doe}
|
||||
\phantomsubcaption\label{fig:dms_qc_ph}
|
||||
\phantomsubcaption\label{fig:dms_qc_washes}
|
||||
\phantomsubcaption\label{fig:dms_snb_decay_curves}
|
||||
|
||||
\endgroup
|
||||
\caption[\gls{dms} Quality Control]
|
||||
{\gls{dms} quality control investigation and development
|
||||
\subcap{fig:dms_qc_doe}{\gls{doe} investigating the effect of initial mass
|
||||
of microcarriers, reaction temperature, and biotin concentration on
|
||||
biotin attachment.}
|
||||
\subcap{fig:dms_qc_ph}{Effect of reaction ph on biotin attachment.}
|
||||
\subcap{fig:dms_qc_washes}{effect of post-autoclave washing of the
|
||||
microcarriers on biotin attachment.}
|
||||
\subcap{fig:dms_snb_decay_curves}{Hydrolysis curves of \gls{snb} in
|
||||
\gls{pbs} or \gls{di} water.}
|
||||
All statistical tests where p-values are noted are given by two-tailed t
|
||||
tests.
|
||||
}
|
||||
\label{fig:dms_flowchart}
|
||||
\end{figure*}
|
||||
|
||||
To answer this question, we first performed a \gls{doe} to understand the effect
|
||||
of reaction parameters on biotin binding. The parameters included in this
|
||||
\gls{doe} were temperature, microcarrier mass, and \gls{snb} input mass. These
|
||||
|
|
@ -1305,64 +1331,6 @@ to the microcarrier suspension (which itself is in \gls{pbs}) this result
|
|||
indicated that hydrolysis is not of concern when adding \gls{snb} within
|
||||
minutes.
|
||||
|
||||
\begin{figure*}[ht!]
|
||||
\begingroup
|
||||
|
||||
\includegraphics{../figures/dms_qc.png}
|
||||
\phantomsubcaption\label{fig:dms_qc_doe}
|
||||
\phantomsubcaption\label{fig:dms_qc_ph}
|
||||
\phantomsubcaption\label{fig:dms_qc_washes}
|
||||
\phantomsubcaption\label{fig:dms_snb_decay_curves}
|
||||
|
||||
\endgroup
|
||||
\caption[\gls{dms} Quality Control]
|
||||
{\gls{dms} quality control investigation and development
|
||||
\subcap{fig:dms_qc_doe}{\gls{doe} investigating the effect of initial mass
|
||||
of microcarriers, reaction temperature, and biotin concentration on
|
||||
biotin attachment.}
|
||||
\subcap{fig:dms_qc_ph}{Effect of reaction ph on biotin attachment.}
|
||||
\subcap{fig:dms_qc_washes}{effect of post-autoclave washing of the
|
||||
microcarriers on biotin attachment.}
|
||||
\subcap{fig:dms_snb_decay_curves}{Hydrolysis curves of \gls{snb} in
|
||||
\gls{pbs} or \gls{di} water.}
|
||||
All statistical tests where p-values are noted are given by two-tailed t
|
||||
tests.
|
||||
}
|
||||
\label{fig:dms_flowchart}
|
||||
\end{figure*}
|
||||
|
||||
We also investigated the reaction kinetics of all three coating steps.
|
||||
|
||||
To quantify the reaction kinetics of the biotin binding step, we reacted
|
||||
multiple batches of \SI{20}{\mg\per\ml} microcarriers in \gls{pbs} at \gls{rt}
|
||||
with \gls{snb} in parallel and sacrificially analyzed each at varying timepoints
|
||||
using the \gls{haba} assay. This was performed at two different concentrations.
|
||||
We observed that for either concentration, the reaction was over in
|
||||
\SIrange{20}{30}{\minute} (\cref{fig:dms_biotin_rxn_mass}). Furthermore, when
|
||||
put in terms of fraction of input \gls{snb}, we observed that the curves are
|
||||
almost identical (\cref{fig:dms_biotin_rxn_frac}). Given this, the reaction step
|
||||
for biotin attached was set to \SI{30}{\minute}.
|
||||
|
||||
% TODO these numbers might be totally incorrect
|
||||
Next, we quantified the amount of \gls{stp} reacted with the surface of the
|
||||
biotin-coated microcarriers. Different batches of biotin-coated \glspl{dms} were
|
||||
coated with \SI{40}{\ug\per\ml} \gls{stp} and sampled at various timepoints
|
||||
using the \gls{bca} assay to indirectly quantify the amount of attached
|
||||
\gls{stp} mass. We found this reaction took \SI{45}{\minute}
|
||||
(\cref{fig:dms_stp_per_time}).
|
||||
|
||||
% TODO find real numbers for this
|
||||
Finally, we used the reaction data from the \gls{stp} binding curve to estimate
|
||||
the \gls{mab} binding curve. Assuming a quasi-steady-state paradigm, we
|
||||
estimated that the diffusion rate coefficient for the microcarriers was
|
||||
{\#}{diffusion rate}. Using this diffusion rate and the maximum mass of
|
||||
\glspl{mab} bound the microcarriers (\cref{fig:mab_coating}), we estimated that
|
||||
the \gls{mab} reaction should proceed in {\#}{mab curve}.
|
||||
|
||||
% TODO add additional paragraph about how this diffusion coefficient was used to
|
||||
% estimate the wash step times.
|
||||
|
||||
% RESULT talk about the kinetic stuff in this figure more
|
||||
\begin{figure*}[ht!]
|
||||
\begingroup
|
||||
|
||||
|
|
@ -1387,6 +1355,64 @@ the \gls{mab} reaction should proceed in {\#}{mab curve}.
|
|||
\label{fig:dms_kinetics}
|
||||
\end{figure*}
|
||||
|
||||
We also investigated the reaction kinetics of all three coating steps.
|
||||
|
||||
To quantify the reaction kinetics of the biotin binding step, we reacted
|
||||
multiple batches of \SI{20}{\mg\per\ml} microcarriers in \gls{pbs} at \gls{rt}
|
||||
with \gls{snb} in parallel and sacrificially analyzed each at varying timepoints
|
||||
using the \gls{haba} assay. This was performed at two different concentrations.
|
||||
We observed that for either concentration, the reaction was over in
|
||||
\SIrange{20}{30}{\minute} (\cref{fig:dms_biotin_rxn_mass}). Furthermore, when
|
||||
put in terms of fraction of input \gls{snb}, we observed that the curves are
|
||||
almost identical (\cref{fig:dms_biotin_rxn_frac}). Given this, the reaction step
|
||||
for biotin attached was set to \SI{30}{\minute}.
|
||||
|
||||
% TODO these numbers might be totally incorrect
|
||||
% TODO state what the effective diffusivity is
|
||||
Next, we quantified the amount of \gls{stp} reacted with the surface of the
|
||||
biotin-coated microcarriers. Different batches of biotin-coated \glspl{dms} were
|
||||
coated with \SI{40}{\ug\per\ml} \gls{stp} and sampled at intermediate timepoints
|
||||
using the \gls{bca} assay to indirectly quantify the amount of attached
|
||||
\gls{stp} mass. We found this reaction took approximately \SI{30}{\minute}
|
||||
(\cref{fig:dms_stp_per_time}). Assuming a quasi-steady-state paradigm, we used
|
||||
this experimental binding data to fit a continuous model for the \gls{stp}
|
||||
binding reaction. Using the diffusion rate of the \gls{stp}, we then calculated
|
||||
the effective diffusivity of the microcarriers to be {\#}.
|
||||
|
||||
Using this effective diffusivity and the known diffusion coefficient of a
|
||||
\gls{mab} protein in water, we calculated predict the binding of \glspl{mab} per
|
||||
time onto the microcarriers (this obviously assumes that the effectively
|
||||
diffusivity is independent of the protein used, which should be reasonable given
|
||||
that the pores of the microcarriers are huge compared to the proteins, and we
|
||||
don't expect any significant reaction between the protein and the microcarrier
|
||||
surface save for the \gls{stp}-biotin binding reaction). According to this
|
||||
model, the \gls{mab} binding reaction should be complete within \SI{15}{\minute}
|
||||
under the conditions used for our protocol (\cref{fig:dms_mab_per_time}). Note
|
||||
that our unoptimized coated steps were done in \SI{45}{\minute}, which seemed
|
||||
reasonable given the slightly larger hydrodynamic radius of \glspl{mab} compared
|
||||
to \gls{stp} which was shown to react in \SI{30}{\minutes} experimentally. The
|
||||
results of this model should be experimentally verified.
|
||||
|
||||
% TODO find the actual numbers for this
|
||||
Finally, we used the effective diffusivity of the microcarriers to predict the
|
||||
time needed for wash steps. This is important, as failing to wash out residual
|
||||
free \gls{snb} (for example) could occupy binding sites on the \gls{stp}
|
||||
molecules, lowering the effective binding capacity of the \gls{mab} downstream.
|
||||
Once again, we assumed the microcarriers to be porous spheres, this time with an
|
||||
initial concentration of \gls{snb}, \gls{stp}, or \glspl{mab} equal to the final
|
||||
concentration of the bulk concentration of the previous binding step, and
|
||||
calculated the amount of time it would take for the concentration profile inside
|
||||
the microcarriers to equilibrate to the bulk in the wash step. Using this model,
|
||||
we found that the wash times for \gls{snb}, \gls{stp}, and \glspl{mab} was
|
||||
\SI{10}{\minute}, {\#} minutes, and {\#} minutes respectively. Note that
|
||||
\gls{snb}, \gls{stp}, and \glspl{mab} each required 3, 2, and 2 washes to reduce
|
||||
the concentration down to a level that was 1/1000 of the starting concentration
|
||||
(which was deemed to be acceptable for preventing downstream inhibition). Using
|
||||
this in our protocol, we verified that the \gls{snb} was totally undetectable
|
||||
after washing (\cref{fig:dms_biotin_washed}). The other two species need to be
|
||||
verified, but note that the consequences of residual \gls{stp} or \gls{mab} are
|
||||
far less severe than that of \gls{snb}.
|
||||
|
||||
\subsection{DMSs can efficiently expand T cells compared to beads}
|
||||
|
||||
% RESULT add other subfigures here
|
||||
|
|
|
|||
Loading…
Reference in New Issue