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Broadband Pump-Probe Spectroscopy Quantifies Ultrafast Solvation Dynamics of Proteins and Molecules Chanelle C. Jumper, Paul C. Arpin, Daniel B. Turner, Scott D. McClure, Shahnawaz Rafiq, Jacob C. Dean, Jeffrey A. Cina, Philip A. Kovac, Tihana Mirkovic, and Gregory D. Scholes J. Phys. Chem. Lett., Just Accepted Manuscript • DOI: 10.1021/acs.jpclett.6b02237 • Publication Date (Web): 04 Nov 2016 Downloaded from http://pubs.acs.org on November 4, 2016
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Broadband Pump-Probe Spectroscopy Quantifies Ultrafast Solvation Dynamics of Proteins and Molecules Chanelle C. Jumper1, Paul C. Arpin1,2, Daniel B. Turner1,3, Scott D. McClure1, Shahnawaz Rafiq4, Jacob C. Dean4, Jeffrey A. Cina5, Philip A. Kovac5, Tihana Mirkovic1, Gregory D. Scholes*1,4 1. Department of Chemistry, University of Toronto, 80 St. George Street, Toronto, Ontario, M5S 3H6, Canada. 2. Department of Physics, California State University, Chico, Chico, California, 959290202 USA. 3. Department of Chemistry, New York University, 100 Washington Square East, New York NY 10003, USA. 4. Department of Chemistry, Princeton University, Washington Rd, Princeton, New Jersey, 08544 USA. 5. Department of Chemistry and Biochemistry, and Oregon Center for Optical, Molecular, and Quantum Science, University of Oregon, Eugene, Oregon 97403, USA
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AUTHOR INFORMATION Corresponding Author *Email:
[email protected] (G.D.S.)
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ABSTRACT In this work we demonstrate the use of broadband pump-probe spectroscopy to measure femtosecond solvation dynamics. We report studies of a rhodamine dye in methanol and cryptophyte algae light harvesting proteins in aqueous suspension. Broadband impulsive excitation generates a vibrational wavepacket that oscillates on the excited state potential energy surface, destructively interfering with itself at the minimum of the surface. This destructive interference gives rise to a node at a certain probe wavelength that varies with time. This reveals the Gibbs free energy changes of the excited state potential energy surface, which equates to the solvation time-correlation function. This method captures the inertial solvent response of water (~40 fs), the bimodal inertial response of methanol (~40 fs and ~150 fs), and reveals how protein-buried chromophores are sensitive to the solvent dynamics inside and outside of the protein environment.
TOC GRAPHICS
KEYWORDS
inertial
solvation,
dynamic
Stokes
shift,
femtosecond
phycobiliproteins, rhodamine dyes, protein solvation, reorganization energy
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spectroscopy,
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The Stokes shift is a measure of the difference between the maximum energies of absorption and fluorescence and is affected by the dielectric properties of the solvent. The Stokes shift can evolve in time after photoexcitation, and this dynamic response to charge redistribution upon light absorption of solute molecules occurs over a wide range of timescales, from femtoseconds to nanoseconds. The solvation correlation function represents the time-development of the Stokes shift and is a key parameter for the investigation of dynamical processes in the condensed phase. The solvation spectral density is related to the solvation correlation function C(t), through the fluctuation-dissipation theorem.1-3 Contributions to C(t) (equation 1) may include both intramolecular vibrational motions and system-bath energy dissipation, where E is the free energy of solvation at times t, zero and infinity: 𝐶 𝑡 =
! ! !! ! ! ! !! !
(1)
The evolution of the dynamic Stokes shift that represents the excited state free energy equilibration generally occurs over several timescales that can be monitored by different spectroscopic methods including time-dependent fluorescence spectroscopy,4 fluorescence upconversion spectroscopy,5-6 transient grating7-10, transient birefringence (optical Kerr effect),9, 11-13 and three-pulse stimulated photon echo peak shift spectroscopy (3PEPS).14-17 Theoretical considerations and femtosecond pulse experiments facilitated the discovery of an initial Gaussian response that makes up a large proportion of equilibration on an ultrafast timescale; ~100 fs or faster followed by slower diffusive picosecond components.18-24 The inertial component can be particularly challenging to capture because of these fast dynamics, and it is limited by the duration of an exciting pulse and by the time resolution of the given experiment. Fluorescence up-conversion and 3PEPS measurements have provided the most insight into the inertial response.3 However, the former has not been reported with a time resolution faster than
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40 fs25 and the latter is generally more easily analyzed for population times longer than 50-100 fs due to obstruction by other signals at short times,26 unless other complicated fitting procedures,15, 27-30
data processing31-33 or additional experimental approaches31 are invoked. As a result, the
shortest time response reported has decreased as a function of experimental advances. In all cases, finite pulse durations limit the extraction of the initial time dependence of the correlation function. Here we use coherent wavepacket evolution analysis34-36 to resolve the ultrafast component of the solvation response for a model molecular system in organic solvent and a set of aqueous chromophore-protein systems. Transient absorption spectra of molecules in solution may reveal oscillatory modulations that are typically signatures of vibrational wavepackets prepared by the ultrashort excitation (pump) pulse.37-38 Upon femtosecond photo-excitation of organic molecules, Franck–Condon-active molecular vibrational wavepackets can be launched on the ground and excited state potential energy surfaces. The distribution of vibrational amplitude between the ground and excited states depend on the duration39, chirp40 and the spectrum of the pump pulse.3436, 41-43
Excited-state vibrations can be selected for by using a sufficiently brief pulse with a
spectrum that covers the entire absorption spectrum of the sample, inhibiting impulsivestimulated Raman excitation of coherent nuclear motion in the electronic ground state. A node present in the amplitude profile of excited state oscillations occurs at the minimum of the potential energy surface due to the interference of antiphasing of oscillations on either side of the peak emission frequency.44 Figure 1 illustrates the evolution of the node over time on the excited state potential energy surface as probed by broadband transient absorption spectroscopy. In the interpretation of the time resolved dynamics of this node, it is useful to separate the free energy picture into
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orthogonal contributions from intramolecular and intermolecular degrees of freedom (as plotted in Figure 1: nuclear coordinate and bath coordinate).45-49 The impulsive excitation of a molecule reaches a Franck-Condon state by vertical transition. Vibrational relaxation from higher vibrational states involves dissipating excess energy through vibrational cooling-transfer processes, that involve transfer of energy to the bath and intramolecular vibrational relaxation. With a broadband probe, stimulated emission is measured at a range of probe wavelengths with superimposed oscillations of the Franck-Condon active modes. The net oscillating component of the pump-probe signal carries an opposite phase on either side of the peak emission frequency. A node in the stimulated emission signal is caused by the destructive interference of intramolecular vibrational modes of the molecule at the minimum of the multidimensional potential energy surface where destructive interference is at a maximum. Since the nuclear displacement of all the intramolecular modes is constant with respect to the ground state potential, the position of maximum destructive interference does not change as a function of vibrational relaxation. Thus, experimentally there is a single node that captures the constant multidimensional interference of all vibrational modes involved in the electronic transition and its position is insensitive to dynamics from vibrational cooling and IVR. However, assuming that the molecule is linearly coupled to the to the solvent, there exists a quadratic free energy relationship of the excited state with respect to the bath coordinate. Solvent relaxation lowers the energy of the excited state potential, shifting the emitted photon energy to lower energy values. As a result, the peak emission frequency and node position shifts to lower energies as a function of only solvent relaxation.50 Figure 1 illustrates how the minimum of the excited states potential energy surface is constant along the nuclear coordinate for a single nuclear harmonic potential, while the free energy of the
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entire surface changes as a function of the evolving bath coordinate. Overall, the intramolecular oscillations are a probe of intermolecular (solvent reorganization) dynamics, and our goal is to investigate the use of this method for resolving the ultrafast solvation response. The benefit of using wavepackets to resolve the solvation response is that the node position is not dependent on population dynamics or convolution with other signals. This method also allows us to investigate more complex (multichromophoric) systems that would otherwise be complicated by energy transfer. In this work, we use these excited state vibrational signals to extract the solvation dynamics for rhodamine 640 perchlorate in methanol and four phycobiliproteins in water.51-52 We compare our results to values obtained from established methods of resolving the solvation dynamics. These samples were chosen in order to explore different examples of solvation dynamics that we can measure with this method. The solvation response of aqueous macromolecular systems such as the protein-chromophore environment is of particular interest since the inertial response is not completely understood.53-56 It is not clear whether the protein or the solvent dominates the ultrafast response,57-59 or has functional effects on important biological processes such as enzyme activity, electronic energy transfer60 or intraprotein electron transfer.61 Based on our results, we discuss some of the general features associated with a protein-chromophore environment and factors associated with the assignment of the inertial response.
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Figure 1. Schematic illustration of nested free energy curves involved in solvation dynamics after excitation (red) along orthogonal degrees of freedom from a generalized bath coordinate (black) and nuclear coordinate (blue). The node position is the minimum of the multidimensional excited state potential energy surface in the nuclear coordinate where destructive interference in the wavepacket is at a maximum. The free energy of the surface (in nuclear coordinate) is lowered as a function of linear coupling to the solvent, and the wavepacket travels along the quadratic free energy curve in the generalized bath coordinate. The time evolution of the node represents dissipation of the excited state energy due to the collective response of the bath motions (inertial and diffusive). In accordance with a one-dimensional displaced harmonic oscillator model coupled to a bath, the position of the node at the minimum of the harmonic well implies that free energy changes as a result of intramolecular relaxation is not captured and this method primarily isolates the response of the bath.
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Molecular solvation dynamics. The solvation dynamics of methanol were examined by using rhodamine 640 perchlorate as a probe molecule. Rhodamine dyes belong to the class of xanthene dyes with transition moment parallel to the long axis of the molecule.62 A carboxyphenyl group attached to the central carbon in xanthene causes molecules of rhodamine 640 (and similarly in rhodamine B) to be found in one of three main molecular forms: cation, lactone or zwitterion.63-65 Rhodamine 640 (also known as rhodamine 101) takes the zwitterionic form in dilute polar protic solutions of the perchlorate and the molecular form can be assigned based on the absorption and fluorescence maxima. Owing to inductive effects, the zwitterion exhibits a hypsochromic shift in polar solvents compared to the cationic or lactone form.63-65 Rhodamine 640 perchlorate steady-state spectra are shown in Figure 2a, with an absorption maximum of 567 nm (17600 cm-1) and fluorescence maximum of 590 nm (16900 cm-1); characteristic of the zwitterionic form of the molecule in methanol. This form of rhodamine dye (Rh B, Rh 640/Rh 101) exhibits moderate solvatochromism,66 and a significant increase in the Stokes shift in methanol compared to gas phase measurements for similar rhodamine dyes.67 The change in dipole moment between ground and excited states for the related dye rhodamine B has been calculated from solvatochromic experiments to be 5.33 Debye.68 In our ultrafast time-resolved measurement, the same broadband pulse was used for both the pump and the probe, shown in red in Figure 2a. The position of the absorption and fluorescence maxima of the dye and the moderate Stokes shift that can be fully captured within the pulse frequency width makes this dye suitable as a probe for these experiments. The pulse duration at FWHM was approximately 14 fs determined by a polarization-gating frequency-resolved optical gating measurement (PG-FROG).
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Figure 2b displays residuals of the pump-probe spectra for rhodamine 640 in methanol, after the population dynamics were subtracted. The population decays were fitted by a biexponential and subtracted at each probe wavelength, and high frequency modes (1000 cm-1 methanol oscillation) were filtered out in the frequency domain with a Super Gaussian filter.35-36 The methanol oscillation is a contaminating nonresonant solvent signal from impulsive Raman scattering. The data filtration procedure along with oscillation maps before and after removal are shown in Supplementary Figure S1. A dynamically shifting node is visible in the data (Figure 2b), beginning near the absorption maximum and approaching the fluorescence maximum. The time evolution of the probe frequency at the node was used to generate a correlation function for the solvent response according to equation (1). The probe frequency position of the node was determined according to the position of minimum amplitude in the coherence spectra. Figure 2c plots the resulting correlation function, fitted by a bi-Gaussian plus exponential decay (refer to the discussion below). The resulting fit parameters are listed in Table 1. The two central half-widths of the biGaussian fit are 37 fs and 144 fs followed by a ~700 fs exponential decay. The excited state oscillations are damped before longer time dynamics can be captured (tens of ps). The reorganization energy listed in table 1 is estimated from the maxima of the absorption and fluorescence energies, which does not distinguish between contributions from intramolecular and intermolecular sources of energy dissipation. The Stokes shift for a set of rhodamine dyes decreases significantly in the absence of solvent according to gas phase measurements, and we estimate that between 1/3 to 2/3 of the reorganization energy is due to solvent effects.67
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Figure 2. Steady state and dynamic spectroscopy of rhodamine 640 perchlorate in methanol. (a) Absorption (black) and fluorescence (blue), and pulse spectrum (red) used for transient absorption measurements. (b) Residual transient absorption spectrum for rhodamine 640 in methanol after subtraction of biexponential population decays determined at each probe wavelength and frequency-domain filtration of high frequency solvent modes. A red-shifting
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node can be seen in the oscillatory features, which approaches the fluorescence maximum. (c) Correlation function generated by equation (1) using the average node frequency and fit by the sum of a bi-Gaussian and exponential decay. Five independent datasets were used to determine the average node value and error bars represent the standard deviation.
In polar solvation dynamics, inertial solvent motions are responsible for a large proportion of the solvation response occurring on an ultrafast timescale.18-19, 69-71 This motion has been referred to as “free-streaming” and refers to the initial frictionless velocities exhibited by the solvent molecules prior to perturbation of the solute charge distribution (i.e. through excitation).20, 72-73 This free-streaming motion at early times after perturbation is sufficient to accomplish much of the solvation response resulting in an overall Gaussian response function at very short times.18-20 The Maxwell-Boltzmann velocity distribution depends only on the temperature and the inertial properties of the solvent, which are unique for methanol compared to other small molecule polar solvents such as water and acetonitrile. Methanol has three principal moments of inertia, Ixx, Iyy and Izz defined by the x-axis along the C-O bond and the y-axis in the plane defined by the COH group. These inertial moments result in two distinct components predicted for methanol OH libration by molecular dynamics simulations, a ~30 fs component about Ixx and two degenerate ~100 fs components about Iyy and Izz.71, 74 Therefore two distinct frequencies are involved in the inertial component as rotations about all three inertial axes cause rotation of the dipole moment responsible for solvation dynamics. The inertial component of methanol solvation was calculated by molecular dynamics simulations and first observed by fluorescence up-conversion by Rosenthal et al.70 The fast component was described by a single mode Gaussian with a half-width of approximately 100 fs,
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followed by 560 fs and 8.1 ps exponential decays. With 50 fs resolution, this was the first observation of an ultrafast component in methanol solvation. It is also possible to fit our data by the sum of a single mode Gaussian and exponentials with Gaussian half-widths of 113 fs and 720 fs, but with a reduced quality of fit. These values are close to the reported values of Rosenthal et al. for methanol for the first two components (Gaussian plus exponential). It is likely that the single mode Gaussian component of 113 fs represents a weighted average of the two distinct inertial components in methanol, which appear to be resolvable by our method and are best described by a bi-modal Gaussian. Other reports for methanol solvation correlation times generally follow multiple exponential decays (or Gaussian plus exponentials) with time constants on the order of 100 fs, 1 ps and 10 ps.6,
15, 74-82
To describe the early time dynamics observed by time-resolved fluorescence of
coumarin 153, Horng et al. included a 30-fs Gaussian component in their fit, combined with a slower 280-fs response, although the 30 fs was included arbitrarily as the limit of the instrument response function.6 A later report on coumarin 153 in methanol reproduced the 100-fs inertial timescale obtained by Rosenthal et al. (above), but reported an exponential decay for the fit.75 Gumy et al.,80 Zhang et al.,81 and Meulen et al.82 obtained a Gaussian response for the inertial component on the timescale of approximately 100-200 fs. Whether or not a Gaussian component has been included in the literature fits to represent the inertial response generally depends on the time resolution of the experiment. Even when the ultrafast component is generally observable in the 100-300 fs range, the initial curvature of the Gaussian component may still not be resolvable, and may only capture the tail end, better fit by an exponential function. Our results resolve the Gaussian component centered at two frequencies described by the differing inertial moments in methanol.
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Table 1. Estimated solvation relaxation times for rhodamine 640 in methanol. ER
A1
½∆ω1-1
A2
½∆ω2-1
A3
τ3
E
688 (cm-1)
0.35
37.0 fs
0.50
144 fs
0.13
733 fs
2%
The values of the relaxation times and their relative weights are determined by fitting the function C(t) = A1exp(-½ω12t2) + A2exp(-½ω22t2) + A3exp(-t/τ3) + E to the time dependence of the node. Δω is the full Gaussian width at half maximum defined by 2(2ln2)½ω. ER is the reorganization energy estimated by the total Stokes shift taken from the difference in absorption maxima and emission maxima. E is the portion of relaxation that has not been captured in the timescale of the experiment (within 4 ps).
Protein Solvation Dynamics. Photosynthetic proteins are good model systems for investigating the aqueous protein solvation response function because they incorporate natural chromophores that serve as probes. Broadband excitation of phycobiliproteins generates vibrational wavepackets in the excited state that allow us to monitor the solvation dynamics. The crystal structures of the four phycobiliproteins investigated: PC577, PC612, PC630 and PC645 are shown in Figure 3. The absorption and emission spectra for each protein are shown in Supplementary Figure S2 with the pulse overlap for the broadband pump probe experiment. Steady state spectroscopic parameters for the four proteins are tabulated in Table 2. The absorption and fluorescence profiles are different for each protein depending on the structure of the protein, the positions of the chromophores and the couplings between them. The broadband pulse overlaps well with the entire absorption spectrum, thereby exciting each embedded chromophore at time zero and initiating both energy transfer dynamics as well as solvation dynamics. The resulting background-subtracted pump probe residuals for each are shown in Figure 3, which reveal oscillations at different frequencies and a zero amplitude node, shifting toward the
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red in time. This node very closely approaches the fluorescence maximum for each protein within the timescale of the experiment (4 ps). The frequency and phase of these oscillations have been previously studied, which revealed a phase shift of the oscillations at the node position indicating the minimum of the excited state potential energy surface.51-52 Monitoring this nodal position over time reveals the transition frequency correlation function, which within the linear response approximation reveals the Stokes shift response function.
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Figure 3. Dynamic spectroscopy and X-ray crystal structures of phycobiliproteins. Residual transient absorption spectra after subtraction of bi-exponential population decays determined at each probe wavelength for (a) PC577, (b) PC612, (c) PC630 and (d) PC645. A red-shifting node can be seen in the oscillatory features, which approaches the fluorescence maximum for each protein. (b) X-ray crystal structures of each protein as labeled. Embedded molecules in red, blue and yellow represent DBV, PCB and MBV chromophores, respectively.
Table 2. Phycobiliprotein steady state spectroscopic parameters in H2O. Absorption (blue edge)
max Absorption (red edge)
max Fluorescence max nm (cm-1)
nm (cm-1)
nm (cm-1)
PC577
577 (17300)
606 (16500)
640 (15600)
PC612
577 (17300)
613 (16300)
641 (15600)
PC630
583 (17200)
629 (15900)
656 (15200)
PC645
585 (17100)
645 (15500)
662 (15100)
The time evolution of the node has been described for a single molecule.44 For a protein that contains eight chromophores, all are potentially experiencing dynamics from solvent reorientation. Why are there not more nodes from chromophores at different spectral positions? It is possible that spectral offsets between the different chromophores overlap the oscillation maps so as to cancel out the nodal features to the blue and we can only resolve the node relating to wavepackets for the most red-absorbing chromophore (ex. PCB 82 bilin in PC645).83-84 Furthermore, this is the only chromophore that does not transfer energy rapidly to other
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chromophores in the complex; a process that decoheres vibrational wavepackets. Secondderivative plots of the oscillatory residuals of PC577 data and simulations, as well as Fourier transform maps in Supplementary Figure S3, indeed reveal some nodal features at wavelengths further to the blue from the terminal chromophore;44 however these are not strong enough to resolve Stokes shifting dynamics from other chromophores in the light-harvesting complex. The probe energy of the red-edge node was measured as a function of time for five independent datasets for each protein. The average correlation function (by equation 2) and standard deviation are plotted in figure 4. The correlation functions were best fit by the sum of a Gaussian function plus exponential. The fitting parameters are tabulated in Table 3. Comparing data for the four proteins, it appears that the timescales for solvent relaxation depend on the protein structure. The Gaussian response decays with a half-width of 22.0 to 62.4 fs depending on the protein, which makes up at least 75% of the overall solvent response. The fastest response occurs in the proteins having the closed structure (PC645 and PC630). The second time constant is also variable between the open and closed protein structures. For the open structures, PC577 and PC612, the second time constant is picosecond scale, ~9 ps and ~4 ps, respectively. For the closed structures, PC630 and PC645, the second time constant is 300-400 fs, about an order of magnitude faster than in the open structures. However, it should be noted that there might be more error associated with the second lifetime due to the time constraints on the experiment. It is possible that either the differing levels of solvent accessibility of the emitting chromophore or the differing local protein environments are responsible for the variability in solvent relaxation times.85-86
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Figure 4. Solvation dynamics. Correlation function (according to equation 2) for the four phycobiliproteins: (a) PC577 (b) PC612 (c) PC630 and (d) PC645. Five independent datasets were used to determine the average node value and error bars represent the standard deviation. The average data are fit by the sum of a Gaussian and exponential decay (red curve). Table 3. Estimated solvation relaxation times for the set of four phycobiliproteins.
Protein
A1
½∆ω1-1
A2
τ2
PC577
0.752
62.4 fs
0.247
9.20 ps
PC612
0.852
54.2 fs
0.148
3.66 ps
PC630
0.908
44.2 fs
0.067
0.386 ps
PC645
0.892
22.0 fs
0.104
0.305 ps
The values of the relaxation times and their relative weights are determined by fitting the data by a Gaussian plus exponential decay function: C(t) = A1exp(-½ω12t2) + A2exp(-t/τ2) + E to the time dependence of the node. Δω is the full Gaussian width at half maximum defined by 2(2ln2)½ω . At least 97.5% of the reorganization is captured by these biexponentials decays (i.e. E ~ 0).
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A chromophore-protein-solvent system is complicated and exhibits a broad range of energetic couplings, and solvation and equilibration timescales.57-59 Upon photoexcitation, three main sources of environmental relaxation may contribute over different timescales: the protein, bulk water and “biological water”, i.e. those that are bound for long timescales on the surface of the protein. Long-range interactions with bulk water are characterized by a dielectric response exhibiting an ultrafast (tens of fs) component and complete relaxation by tens of ps.16, 19, 87 Protein reorientation occurs on a nanosecond timescale.88 We can see in these results that over 97% of the equilibration is obtained within the timescales that are equivalent to interaction with bulk water, indicating that slower nanosecond protein reorientation does not contribute significantly. The inertial response in a chromophore-protein-solvent system53 and other aqueous macromolecular systems54-56 is not completely understood. A debated question is whether the protein or the solvent dominates the ultrafast response,57-59 and it is unclear if the inertial response has functional effects on important biological processes like enzyme activity, electronic energy transfer60 or intraprotein electron transfer.61 We will discuss some of the general features associated with a protein-chromophore environment and factors associated with the assignment of the inertial response: reorganization energy, rigidity of the protein environment, inertial moments and ultrafast protein side group fluctuations. The magnitude of the reorganization energy reflects the solvation capacity of a given medium. The Stokes shift of a chromophore embedded in a protein has been shown to be smaller than that of the same chromophore in solution, for example for eosin in the aqueous lysozyme complex87 and equilenin and coumarin 183 bound to the active site of a ketosteroid isomerase protein,89 and for the dye DCM in Human Serum Albumin.90 In the ketosteroid isomerase, the active site was interpreted as being an electrostatically rigid environment.89 A similar reduction in the Stokes
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shift is seen comparing a dye in methanol versus in a polymer glass at room temperature.3 The interior of a protein where chromophores bind is generally considered to be hydrophobic, and non-polar environments are reported to be inefficient at dissipating energy from excited states of chromophores.91 This may limit the overall solvation response. Based on these simple arguments of electrostatic rigidity and reduced polarity, it has been argued that dissipation can be directed to water molecules through longer-range interactions.85,
87
Even when the protein shields a
chromophore from the solvent, the solvent can still dominate the inertial response, though the mechanism is not understood.57, 85, 92 If inertial protein motions are involved in equilibrating a newly formed electronic charge distribution, then we must consider the motions available to residues on the interior of a protein or active sites, where chromophores and ligands bind. The contribution to the inertial response of small solvent molecules such as water, methanol and acetonitrile is large owing to their small inertial moments. The relative amplitude of the inertial response has been shown to decrease as a function of molecular length for a range of alcohols from methanol to decanol,6 and for methanol, ethanol and a series of alkanenitriles.80 It was reasoned that inertial solvation is more efficient in small solvents because inertial motion can involve rotation of the whole solvent molecule while in longer molecules contribution is limited to the polar heads. In a protein environment, similar restricted inertial motions of polar or charged side groups may be expected and have been calculated.93 The results in this work reveal that the amplitude of the inertial response is at least 75%, which is characteristic of the inertial component of small molecule polar solvents. However, proteins can undergo internal motion on femtosecond to picosecond timescales and fast fluctuations of protein side groups have been thought to contribute to the overall relaxation.7, 94 Molecular dynamics simulations have suggested that relaxation, atomic and
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velocity displacements, can occur in proteins on sub 100 fs timescales.95-99 Indeed, it has been shown that a single hydrogen bond between a chromophore and protein environment entirely dominate the solvent response.100 Considering all of these factors combined, solvation response in a chromophore-proteinsolvent system is likely as unique as each protein itself, and such properties may even be subject to evolutionary pressure.89 In a review of a large collection of chromophore-protein solvation dynamics, Gilmore argues that under certain conditions, the surrounding protein dominates the dynamics of the excited chromophore and in others the solvent dominates.57 The most direct example of a free- versus protein-bound chromophore is the comparison between eosin in solution and that bound to the lysozyme protein by Jordanides et al.87 Here, the mechanism of the ultrafast response was shown to be identical and dominated only by librational motion of bulk water molecules, while longer timescales show deviations owing to the protein response, which can approach milliseconds. At least in small soluble proteins this may be the case. Our results demonstrate that different protein local environments may at least partially contribute to a change in the inertial response, evidenced by the varying inertial response times of the open vs. closed protein structures investigated. This is a complicated topic, and it is clear that more experimental input is needed on the solvation capabilities and polarity of a protein.101 Simple assumptions of a nonpolar homogeneous environment, characterized by a low dielectric constant, do not allow for a complete understanding of potentially finely tuned dynamics occurring within a protein. Finally, the role of solvation relaxation on other functional effects in proteins and biomolecules is not fully understood either. We see in these phycobiliproteins that solvent relaxation can occur on timescales comparable to electronic energy transfer, and
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furthermore that energy transfer is faster in the structures that exhibit the faster solvent relaxation.51 Overall, coherent wavepacket evolution analysis offers an alternative to other methods for determining the early response times of the environment to a molecular charge in solvent or embedded in a protein, especially concerning multiple chromophoric systems. While 3PEPS has successfully been used to monitor solvation response of embedded chromophores in proteins, multiple chromophore systems represent a special case. Capturing the solvation dynamics around photosynthetic proteins is challenging due to complications by energy transfer events, thus coherent wavepacket evolution analysis may offer an alternative. When performed with sufficiently short pulses, the source of the signal is from the excited state vibrations, and we obtain an accurate description of the early time dynamics. Pulse overlap that would normally complicate the extraction of M(t) from 3PEPS signals, and even convolution in fluorescence upconversion,102 does not complicate the node, and the excited state equilibration can be modeled by exponential decays beginning as early as 10 fs. The time evolution of the node is also free of oscillations that are seen in fluorescence up-conversion.70 Overall, this is a promising method to elucidate early time solvation dynamics around a wide range of sample types.
Experimental Growth and Isolation of Light-Harvesting Complexes: Hemiselmis pacifica (CCMP706) was cultured in the enriched seawater medium, Prov50 (from NCMA), on a 12/12 h dark−light cycle 20 μE m−2 s−1 in the growth chamber at 16 °C, while Chroomonas (CCAC 1627 B, also M1627) was grown under identical conditions, but in the L1 medium (also from NCMA). Chroomonas mesostigmatica (CCMP269) was cultured at room temperature in either K or Prov50 media from
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NCMA on a 12/12 h dark−light cycle 20 μE m−2 s−1. Cells were harvested by centrifugation and were resuspended in a 0.1 M sodium phosphate buffer (pH 7.5). Phycocyanin 577 (PC577) was isolated from Hemiselmis pacifica (CCMP706), phycocyanin 630 (PC630) was obtained from Chroomonas (CCAC 1627 B, also M1627), whereas phycocyanin 645 (PC645) was extracted from Chroomonas mesostigmatica (CCMP269). The water-soluble phycobiliproteins were extracted through freezing and thawing (−20 and 4 °C) in the dark. Further purification steps required centrifugation to remove any impurities following successive ammonium sulfate precipitation (40, 55, and 80%). The final centrifugation at 80% was performed in an ultracentrifuge for 20 min at 35 000 rpm, and the resulting protein pellet was resuspended in 0.050 M phosphate buffer (pH 7.5) for storage at −20 °C. Prior to experiments being run, the stored protein samples were thawed and dialyzed against a 0.025 M phosphate buffer (pH7.5) to remove excess ammonium sulfate. Proteins were diluted to an optical density (O.D.) of 0.15/mm. Steady State Spectroscopy: Solution-phase steady state measurements were recorded at room temperature. Absorption spectra of rhodamine 640 perchlorate and phycobiliproteins were recorded using a Varian Cary 6000i UV-Vis spectrometer with a resolution of 1 nm at room temperature. Fluorescence emission and excitation spectra were recorded on a Fluorolog-3 (Horiba) spectrometer in a 90° mode, with a xenon arc light source and an R928 photomultiplier tube. Pump Probe Experiments: The transient absorption spectrometer set-up is described in detail elsewhere.52 Broadband pulses were generated from a commercial 5 kHz Ti:Sapphire laser amplifier pumped into a home-built non-collinear optical parametric amplifier (NOPA). For rhodamine experiments, the spectrum was tuned centrally to 580 nm and extrended past 650 nm, overlapping well with the absorption spectrum (Figure 2). The pulse was compressed with
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grating and prism compressors to ~14 fs as determined by a polarization-gating frequencyresolved optical gating measurement. For protein experiments, the spectrum was tuned centrally to 580 nm with a weak tail extending past 750 nm, overlapping well with the entire protein absorption spectra (Supplementary Figure S2). The pulse was compressed to ~10 fs by grating and prism compressors and pulse duration was determined by a transient-grating frequencyresolved optical gating measurement. The pulse was split into identical pump, probe and reference beams with a 1-degree UV fused silica wedge. The probe beam was directed through the sample and was dispersed and focused onto a 1.25 kHz CCD detector. Rhodamine dyes were measured in a 1-mm glass cuvette. Proteins samples were kept in an ice bath and flowed through a 1-mm cuvette at a rate of 1 mL/min with a peristaltic pump. The sample was pumped at 14 nJ/pulse for proteins and 12 nJ/pulse for dyes and successive sets of 4 probe pulses with the pump blocked and unblocked were recorded. The pump and probe beam had parallel polarization and were focused onto 1/e beam diameters of 40 μm and 15 μm respectively. The probe intensity was balanced by the reference beam intensity as measured on a photodiode to eliminate influences from laser fluctuations during the experiment. The ∆I/I value was then determined by:
𝐼!"#"$%&'
𝐼! 𝐼! 𝑆! − 𝑆! = 𝐼! 𝑆!
where Ip and Iu are the intensities of the pumped and unpumped probe signal, respectively, and Sp and Su are the corresponding intensities of the photodiode signals. The values entered into this equation are the sum of the 4-pulse sequence, and averaged for 300 consecutive cycles. This process was repeated for each delay time between -0.4 and 4 ps and repeated for five trials.
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ASSOCIATED CONTENT Supporting Information. The following files are available free of charge. Frequency domain data filtration procedure, protein steady-state spectra (absorption and fluorescence), and Fourier transform maps PDF. AUTHOR INFORMATION Notes The authors declare no competing financial interests. ACKNOWLEDGMENT CCJ is supported by the Natural Science & Engineering Research Council. This work was supported by the Natural Sciences and Engineering Research Council of Canada and the United States Air Force Office of Scientific Research (FA9550-13-1-0005). PAK and JAC were supported in part by National Science Foundation grant CHE-1213406.
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Three Amino-Substituted Coumarin Dyes in Methanol and Dimethyl Sulfoxide. The Journal of Physical Chemistry A 1998, 102, 4229-4245. 78. Tominaga, K.; Walker, G. C., Femtosecond Experiments on Solvation Dynamics of an Anionic Probe Molecule in Methanol. Journal of Photochemistry and Photobiology A: Chemistry 1995, 87, 127-133. 79. Zong, Y.; McHale, J. L., Resonance Raman Study of Solvent Dynamics in Electron Transfer. Ii. Betaine-30 in Ch3oh and Cd3od. The Journal of Chemical Physics 1997, 107, 29202929. 80. Gumy, J.-C.; Nicolet, O.; Vauthey, E., Investigation of the Solvation Dynamics of an Organic Dye in Polar Solvents Using the Femtosecond Transient Grating Technique. The Journal of Physical Chemistry A 1999, 103, 10737-10743. 81. Zhang, T.-q.; Wang, S.-f.; Yang, H.; Li, J.-l.; Gong, Q.-h., Solvation Dynamics of Methanol Investigated by Femtosecond Time-Resolved Fluorescence up-Conversion Technique. Acta Physica Sinica (Overseas Edition) 1999, 8, 383. 82. van der Meulen, P.; Zhang, H.; Jonkman, A. M.; Glasbeek, M., Subpicosecond Solvation Relaxation of 4-(Dicyanomethylene)-2-Methyl-6-(P-(Dimethylamino)Styryl)-4h-Pyran in Polar Liquids. The Journal of Physical Chemistry 1996, 100, 5367-5373. 83. Marin, A.; Doust, Alexander B.; Scholes, Gregory D.; Wilk, Krystyna E.; Curmi, Paul M. G.; van Stokkum, Ivo H. M.; van Grondelle, R., Flow of Excitation Energy in the Cryptophyte Light-Harvesting Antenna Phycocyanin 645. Biophysical Journal 2011, 101, 1004-1013. 84. Mirkovic, T.; Doust, A. B.; Kim, J.; Wilk, K. E.; Curutchet, C.; Mennucci, B.; Cammi, R.; Curmi, P. M. G.; Scholes, G. D., Ultrafast Light Harvesting Dynamics in the Cryptophyte Phycocyanin 645. Photochemical & Photobiological Sciences 2007, 6, 964-975. 85. Cohen, B. E.; McAnaney, T. B.; Park, E. S.; Jan, Y. N.; Boxer, S. G.; Jan, L. Y., Probing Protein Electrostatics with a Synthetic Fluorescent Amino Acid. Science 2002, 296, 1700-1703. 86. Abbyad, P.; Shi, X.; Childs, W.; McAnaney, T. B.; Cohen, B. E.; Boxer, S. G., Measurement of Solvation Responses at Multiple Sites in a Globular Protein. The journal of physical chemistry. B 2007, 111, 8269-8276. 87. Jordanides, X. J.; Lang, M. J.; Song, X.; Fleming, G. R., Solvation Dynamics in Protein Environments Studied by Photon Echo Spectroscopy. The Journal of Physical Chemistry B 1999, 103, 7995-8005. 88. Grant, E. H.; Sheppard, R.; South, G., Dielectric Behaviour of Biological Molecules in Solution; Clarendon Press, 1978. 89. Childs, W.; Boxer, S. G., Solvation Response Along the Reaction Coordinate in the Active Site of Ketosteroid Isomerase. Journal of the American Chemical Society 2010, 132, 6474-6480. 90. Pal, S. K.; Mandal, D.; Sukul, D.; Sen, S.; Bhattacharyya, K., Solvation Dynamics of Dcm in Human Serum Albumin. The Journal of Physical Chemistry B 2001, 105, 1438-1441.
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