Team:Dundee/Project/PP1Capacities

From 2013.igem.org

Revision as of 10:24, 3 October 2013 by Fdavidso (Talk | contribs)

iGEM Dundee 2013 · ToxiMop

Introduction

Microcystin’s toxic action lies in its ability to bind to and deactivate the human Protein Phosphatase-1 (PP1). Microcystin covalently binds to PP1 in a one-to-one relation between a single Microcystin molecule and a single PP1 molecule. Therefore, higher binding potentials of a PP1 mop are achieved by producing larger amounts of PP1 in the bacterial chassis (E. coli and B. subtilis).

The two options explored for our mop bacteria were to export PP1 to the periplasm of E. coli and onto the membrane surface of B. subtilis. We investigated the potential PP1-binding efficiency of both chassis options based upon geometrical packing, which provided a crude but potentially very useful estimation.

Theory

When considering the maximum number of PP1 molecules physically compacted into the periplasm of E. coli or onto the membrane surface of B. subtilis, considerations for wasted space must be taken into account. This wasted space arises due to the impossibility of using all of the available space due to the physical configuration of PP1.

Before beginning such analyses, assumptions must be made regarding the shape and form of the PP1 molecules. To best describe the PP1 protein shape, without unnecessary over complication, PP1 was approximated as a sphere with a diameter equal to the width of the minimal osculatory cubic enclosure of the molecule. This approximation allows for the possibility of random orientations of the PP1 molecules and therefore gives an average result. The radius of PP1 is thus calculated as ~9.1nm.

In calculating the available volume of the E. coli or B. subtilis cell, the chassis were approximated as cylindrical bodies with hemispherical ends. Furthermore, the dimensions of E. coli and B. subtilis cells were taken as being approximately equivalent and were based upon the known dimensions of E. coli. “Each bacterium measures approximately 0.5 μm in width by 2 μm in length.”[2] .



The equations describing the volumes of spheres of radius r and cylinders of radius r and height h are given:

Making use of this approximation and these equations, the volume of an E. coli cell can be calculated as the volume of a cylinder of radius 0.25μm and height 1.5μm and the volume of a sphere of radius 0.25μm (the two hemispheres can be brought together and calculated as a single sphere).

E. coli

For E. coli with a periplasmic width of 21nm, the periplasm volume can be calculated by considering the cell as two parts.

To calculate the periplasmic volume of E. coli, we next needed to calculate the volume of the XXXX ?spheroplast? (region comprising the inner membrane and cytoplasm). This is again taken to be a cylinder now of radius 0.25-0.021 = 0.229 μm and length of 1.5μm. The two flanking hemispheres in this case have a radius 0.229μm. Therefore the volume of the XXX?? is



Therefore, the volume of the periplasm in E. coli is calculated to be:

To determine the number of PP1 molecules that could be packed into the periplasm, we determined the volume of a single PP1 molecule. This volume can be taken as that of a sphere of diameter 9.1nm. However, when considering the volume that a single molecule will occupy, the space in between molecules must also be considered. To take account of this wasted space, a cubic approximation was made:



Thus, the volume of a PP1 molecule is assumed to be:

Hence, the maximum number of PP1 molecules that could be packed into the periplasm of E. coli can be approximated by:

B. subtilis

When considering the packing of PP1 on the surface of B. subtilis, there is no defined volume for packing. B. subtilis is a Gram-positive cell and so the PP1 molecules are adhered in a monolayer to the surface of the cell membrane. Therefore, the approach to packing is different in this case.

In packing PP1 on the surface of the membrane, the number of PP1 molecules that can be placed “side-by-side” along the height of the membrane and around the circumference of the membrane was calculated.

The number of PP1 molecules able to be stacked along the length of the cylindrical centrepiece of the cell (excluding the hemispheres) and around the circumference of the cylinder top:

Multiplying the above results gives the total number of PP1 molecules which can occupy the surface of the cylindrical midsection of the bacteria.





The number of PP1 molecules which could occupy the hemispherical ends can be calculated by approximating the hemispherical ends as flat circles. This approximation is appropriate due to the smaller contribution at these ends.



Thus, the total number of PP1 which could occupy the surface of B. subtilis can be calculated as the sum of the above.


Conclusion

In conclusion, we considered the volumes of the bacteria and PP1 and used a cube approximation that took into account volume which was wasted, in packing, by the spherical shape of the protein. For this model we assumed there were no other surface proteins and protein production was not limited by any factors.

Calculations show the maximum number of PP1 which can fit on the surface of B. subtilis is approximately 35,000. From this approximation, we can calculate that the number of bacterial mops required to clean a toxic level of microcystin in a litre of water as 5.3x109 cells.

In E. coli, the PP1 which would bind microcystin is freely diffusing in three dimensions in the periplasm. The volume of the periplasm is much greater than the surface of B. subtilis. Therefore, E. coli has the capacitive potential to be a more efficient mop. The maximum number of PP1 which can be packed into the periplasm is approximately 83,000. Consequently, less bacterial mops are required to clean the same level of microcystin: 2.2x109 cells.

Having shown that E. coli has the potential to be the more efficient mop, the geometric packing results were presented to the wet team in Week 1. When later in the project it was found that there were issues in exporting PP1 to the surface of B. subtilis, a focus on E. coli as the chassis for the bacterial mop was justified and appropriate both biologically and mathematically.