Posts Tagged ‘chemical reactions’

A Theoretical Method for Distinguishing X‐H Bond Activation Mechanisms.

Wednesday, July 25th, 2018

Consider the four reactions. The first two are taught in introductory organic chemistry as (a) a proton transfer, often abbreviated PT, from X to B (a base) and (b) a hydride transfer from X to A (an acid). The third example is taught as a hydrogen atom transfer or HAT from X to (in this example) O. Recently an article has appeared[1] citing an example of a fourth fundamental type (d), which is given the acronym cPCET which I will expand later. Here I explore this last type a bit further, in the context that X-H bond activations are currently a very active area of research.

To help understand these four types, I have colour-coded the electron pair constituting the X-H covalent bond in red.

  1. In mechanism (a), this electron pair stays with X, thus liberating a proton which is captured by the base.
  2. The hydride transfer (b) is so-called because in fact this electron pair travels together with the proton, hence the term hydride or H.
  3. Hydrogen atom transfers as in (c) in effect transfer both a proton and one electron to another atom (oxygen in the example above), leaving behind one electron on X. The electron and the proton are said to travel together as a “true” hydrogen atom.
  4. The fourth mechanism (d) is fundamentally different from (c) in that whilst the electron and the proton travel in concert (at the same time), they do not travel together. In this example the proton travels to the oxygen, whilst the electron travels to the iron centre, in the process reducing its oxidation state. This mode is now called a concerted proton-coupled electron transfer, or cPCET as above.

The tool employed to distinguish between mechanisms (c) and (d) is the IBO or intrinsic bond orbital localisation scheme.[2] One practical advantage of such a scheme over better known localisation methods such as NBO (Natural bond orbitals) is that IBOs can be made to transform smoothly during the course of a reaction, as followed by say an IRC (Intrinsic reaction coordinate). NBOs may instead show discontinuous behaviour along a reaction IRC. Klein and Knizia have located transition states for examples of both (c) and (d) above and studied the IBOs along such IRCs. The two IBO reaction transformations are very different, as illustrated below (used, with permission, from the article itself). For the HAT type (X=C above), an α-spin IBO morphs from a C-H bond into a H-O bond, whilst the β-spin counterpart morphs from being located on the C-H bond into a carbon-centered radical. For the cPCET mode, the α-spin IBO morphs from C-H to a C-centered radical, but the β-spin region grows onto an iron d-orbital. It is in fact even more complex than the diagram above implies, since some reorganisation of the O-Fe region occurs and the H…:O region is still anti-bonding at the transition state.

We can see from this that mechanistic reaction analysis is starting to track the “curly arrows” we conventionally use to represent reactions in some detail, as well as informing us about the relative detailing timing of the various curly arrows used. Of course this latter aspect cannot be easily represented by conventional curly arrows. It seems timely to revisit the vast corpus of organic and organometallic “curly arrow pushing” to starting adding such information!

References

  1. J.E.M.N. Klein, and G. Knizia, "cPCET versus HAT: A Direct Theoretical Method for Distinguishing X–H Bond‐Activation Mechanisms", Angewandte Chemie International Edition, vol. 57, pp. 11913-11917, 2018. https://doi.org/10.1002/anie.201805511
  2. G. Knizia, "Intrinsic Atomic Orbitals: An Unbiased Bridge between Quantum Theory and Chemical Concepts", Journal of Chemical Theory and Computation, vol. 9, pp. 4834-4843, 2013. https://doi.org/10.1021/ct400687b

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Conference report: an example of collaborative open science (reaction IRCs).

Thursday, May 25th, 2017

It is a sign of the times that one travels to a conference well-connected. By which I mean email is on a constant drip-feed, with venue organisers ensuring each delegate receives their WiFi password even before their room key. So whilst I was at a conference espousing the benefits of open science, a nice example of open collaboration was initiated as a result of a received email.

Steven Kirk  contacted me with the following query: Do you know of any open-access database of calculated IRCs with coverage of as broad a range of classes of chemical reactions as possible? I recollected that about six years ago, I was exploring the use of iTunesU as a system for delivering course content in a rich-media format. I produced animations for about 115 reactions (many of which as it happens were taken from this blog, but quite a number were also unique to that project) and placed them into iTunesU, and now sending the URL https://itunes.apple.com/gb/course/id562191342 to Steven.

I should at this point explain something of the structure of such an iTunesU course.

  1. An essential feature is the course icon, seen below on the left. Since the course is hosted by Imperial College, it had to be an officially approved icon. I am sure you can believe me if I tell you that this took a month or so to obtain, with a fair bit of persistence required!
  2. I also had to get approval to place the iTunes app on all the teaching computers so that students could open the course. Believe me again when I tell you that I had to persuade the Apple lawyers in Cupertino to release a special license for this app to persuade our administrators here to install it on the Windows teaching clusters. Another few months had passed by.
  3. When creating an entry (using e.g. https://itunesu.itunes.apple.com/coursemanager/ ) one has to specify values for various descriptors, also often called metadata. Thus any one entry has fields for name and description, with the popularity added by Apple. Only a few words are visible in the description field, which can be expanded in iTunes using the i button.
  4. Steven meanwhile had replied asking if the original data that was used to generate the IRC might be available. Specifically his second question was “So the DOIs are only stamped into the animation’s bitmaps, or are they also somewhere in the metadata?“. That little i button is not easy to spot, and there is no indication, in the event, of what information it might actually contain.
  5. Here it is expanded. The contents are unstructured text, into which I have placed the required DOI.
  6. The lesson here is that I had fortunately had the foresight to include a link to the IRC data in anticipation of just such a question from someone in the future. But black mark to Apple here; the text cannot be selected and copied into a clipboard! It is fairly unFAIR data, since it can only be inter-operated (the I of FAIR) by a human re-typing it by hand. And the human has also to recognise the pattern of a DOI; a machine could not obtain this information easily. Moreover Steven is a Linux user; he does not readily have access to the iTunes app on this operating system!
  7. Also, there were 115 such entries, and now the prospect was rearing that each would have to be hand processed. Moreover, because the text was unstructured, there was no guarantee that I would have adopted the same pattern for all 115 entries.
  8. Fortunately Steven was on the ball. I quote again: it turns out iTunes isn’t needed at all. A service I found on the web http://picklemonkey.net/feedflipper-home/ takes an ITunes URL and converts it to an RSS feed. Opening this feed in Firefox and RSSOwl respectively let me save the feed as XML and HTML (both attached).
  9. This is currently where we stand (Steven’s first email was two days ago), but it’s not finished yet. Depending on how assiduous I was five years ago, some DOIs to the data may be acquired from the list. Sometimes I simply wrote e.g. See http://www.ch.imperial.ac.uk/rzepa/blog/?p=6816 knowing that the links to the data were there instead. I can already see that some descriptions have neither a DOI nor a link to the blog. More detective work will be needed, unfortunately.

How might the situation described above been avoided? Well, Apple in iTunesU only provided in effect one metadata field, and this was an unstructured one. Anything went in that field. Had they provided (or had the course creator been able to configure it themselves) there might have been another field entitled say “data source“. This could moreover been made a mandatory field and a structured one. Thus it might have only accepted known types of persistent identifier, such as a DOI. Further, the system could have checked that the DOI was actually resolvable. Before you ask, I did log a “bug” with Apple asking this be done, but nothing ever was. With such a tool to hand, I might have achieved data sources for all the 115 entries. The resulting XML (as generated above) could have been used to automate the retrieval of all 115 datasets describing this course. 

At this stage then, Steven can follow-up his interest in building a reaction IRC library and analysing it. I will do all I can to encourage Steven not to make the mistakes I did and to ensure that any further data that is required to augment the library does not suffer the problems above. On the other hand, I console myself that in two days, much of the data for the course I created five years ago was salvageable; I wonder how many other iTunesU courses there are for which that can be said!

I will let (with some blushing) the final word be Steven’s: You are one of the few chemists who has both pioneered and built the principles of ‘open chemistry’ into their actual scientific work. I visit your blog occasionally knowing that there is a very high probability I could download and tinker with the results of real calculations.

Might I assure all the speakers that I concentrated totally on their talks rather than incoming emails!

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I’ve started so I’ll finish. The mechanism of diazo coupling to indoles – forty (three) years on!

Thursday, December 24th, 2015

The BBC TV quiz series Mastermind was first broadcast in the UK in 1972, the same time I was starting to investigate the mechanism of diazocoupling to substituted indoles as part of my Ph.D. researches. The BBC program became known for the catch phrase I've started so I'll finish; here I will try to follow this precept with the project I started then.

Indole diazocoupling

In 1972, one measured the rates of chemical reactions to gain insights into the transition state kinetic model. To obtain more data, we used isotopes such as 2H or 3H, together with substituents such as R-t-butyl to modify the potential energy surfaces of the reactions by inducing steric effects.[1],[2] We found that the kinetics for this reaction were actually complex (in part because of pH dependence) involving a Wheland intermediate (the formation of which is shown with red curly arrows above) followed by the collapse of this intermediate to the diazo-coupled product (blue arrows). Coupling to 2-methyl indole (R=X=H, R'=Me), 2-t-butyl indole (R=H, R'=t-butyl) and 4-methyl-2-t-butyl indole (R=Me, R'=t-butyl) revealed that the kinetic isotope effects induced by replacing H by D or T were "not apparent" (i.e. close to 1), the inference being that the rate constant k1 for those systems was slower than k2; the formation of the Wheland intermediate was rate determining (the rds) for the reaction. But with 2-methyl-4,6-di-t-butyl indole (R=t-butyl, R'=Me) this changed and a deuterium isotope effect of ~7 was observed. The rate determining proton removal from the Wheland intermediate k2 was now slower than k1. With 2,4,6-tri-t-butyl indole, we ended by noting that the reaction become almost too slow to observe and furthermore was accompanied by loss of a t-butyl cation as well as a proton.

At this point we attempted to infer some transition state models consistent with these observations. Note that we had relatively little data with which to derive our 3D models (one needs to define a geometry using 3N-6 variables, along with its relative energy and force constants). The text and diagram of our attempt is shown below.

TS1

The main points of this argument were;

  1. That the Wheland complex is asymmetric, with the diazonium ion adopting a pseudo-axial line of attack.
  2. In contrast, the leaving proton lies closer to the plane of the indole ring
  3. The abstracting base experiences "steric hindrance" if R = t-butyl but not if R' = t-butyl.

I was eager to find out how one might test these models by quantum computation and my next stop in 1974 was to Austin Texas, where Michael Dewar's  group was soon to break the record for computing the geometry of a molecule with 49 atoms (similar in size to the reactions shown above) using the then very new semi-empirical MINDO/3 valence-shell quantum theory. The theory still needed much improvement in a great many aspects and the last forty years has brought us features such as density functional theories, far more accurate all-electron basis sets, superior geometry optimisation methods for transition states, code parallelisation, solvation treatments and increasing recognition that a particular form of electron correlation associated with dispersion energies needed specific attention. These methods would not have become applicable to molecules of this size had the computers themselves not become perhaps 10 million times faster during this period, with a commensurate increase in the digital memories required and decrease in cost.

Time then to apply a B3LYP+D3/Def2-TZVP/SCRF=water quantum model to the problem. Four species were computed for each set of substituents; the reactant, a transition state for C…N bond formation (TS1), a Wheland intermediate and a transition state for C-H bond cleavage (TS2). The relative free energies of the last three with respect to the first are shown in the table below. An IRC for R=R'=H (below) was used to show that a bona-fide Wheland intermediate is indeed formed.[3]

IRC animation for TS1, R=R'=H
TS1 IRC
IRC for TS2, R=R'=H
TS2

The relative free energies (kcal/mol) are shown in the table below and the following conclusions can be drawn from this computed model:

  1. For R=R'=H, ΔG298 for TS1 is higher than TS2 (✔ with expt)
  2. With R=t-butyl,R'=Me, ΔG298 of TS1 is 3.1 kcal/mol lower than with R=R'=H. This indicates that t-butyl and methyl groups actually activate electrophilic addition by stabiisation of the induced positive charge, and have no steric effect upon the first step (✔ with our conclusions).
  3. For R= t-butyl,R'=Me, ΔG298 of TS1 is lower than TS2 (✔ with expt).
  4. With R=R'= t-butyl, ΔG298 of TS2 is 4.9 kcal/mol higher than with R=R'=H and is 3.1 kcal/molhigher with R=t-butyl,R'=Me, indicating the steric effect acts on this stage.
  5. The angle of approach of the diazonium electrophile is ~123-118° for R=R'=H and R=R'=t-butyl, about 30° away from a strict pseudo-axial "reactant-like" approach as implied in our sketch above (❌ with diagram above)
  6. The angle of proton abstraction with the plane of the indole ring is 107° for R=R'=H and 100.3° for R=R'=t-butyl, the hydrogen being closer to pseudo-axial than equatorial, relative to the plane of the indole ring  (❌ with diagram above).
  7. The position along the reaction path for proton abstraction is much later with R=R'=t-butyl (rC-H ~1.42Å) than R=R'=H (rC-H ~1.27Å),  (❌ with the statement above: a reactant-like transition state even for the proton expulsion step).
  8. The cross-over between TS1/TS2 as the rds is in the region of the substituents R=Me,R'=t-butyl (~✔ with expt).
  9. The steric interaction occurs not so much between the incoming base and the t-butyl groups, but because of enforced proximity between the t-butyl group and the diazo group induced during the proton removal stage.
  10. The steric effect induced by R=t-butyl is greater than when  R'=t-butyl.
  11. The Wheland intermediate is in a relatively shallow minimum.
R, R'

TS1,
ΔG298 

k1

 ∠ N1-C3-N2

ΔG298 

TS2,
ΔG298 

k2

 ∠ N1-C3-H

ΔΔG
(TS2-TS1)

 kH/kD
(calc)
[4],[5]
R=R'=H 21.4[6],[7] 122.9 19.6[8] 18.6[9] 107.0 -1.8 0.925 (TS1)
R=Me,R'=t-butyl 16.9[10],[11] 121.8 15.2[12] 18.4[13] 101.8 +1.5 0.900 (TS1)
6.4 (TS2)
R=t-butyl,R'=Me 18.3[14],[15] 115.2 16.0[16] 21.7[17] 100.9 +3.4 6.8 (TS2)
R=R'=t-butyl 17.8[18],[19] 117.6 17.8[20] 23.5[21] 100.4 +5.2 6.9 (TS2)

Possible errors in the model:

  1. I have not included any explicit solvent water in which hydrogen bonds to the base (the chloride anion) might moderate its properties.
  2. The ion-pair reactant complex between the phenyl diazonium chloride and the indole has many possible orientations, and these have not been optimised.
  3. The free energies are subject to the usual errors due to the rigid-rotor approximations and other artefacts of partition functions.
  4. Other DFT functionals have not been explored, nor have better basis sets.
  5. This current study is confined to formation of the cis-diazo product.

But even such a model seems to reproduce much of what we learnt about diazocoupling to 2,4-substituted indoles. The calculations you see above took about a week to set up and complete; the original experimental work took (in real-time) ~150 weeks (interleaved with two other mechanistic studies). Also efficient implementation of the quantum theories, together with the computer resources to evaluate the molecular energies and geometries, was almost entirely lacking in 1972 and this has probably only become a realistic project in the last five years or so. So that 43 year wait to finish what I started seems not unreasonable. Nowadays of course, combining experimental kinetic measurements with computational models very often goes hand in hand.

It is also worth speculating about the wealth of mechanistic data garnered during the heyday of physical organic chemistry during  the period ~1940-1980. The experiments were not then informed by feedback from computational modelling. However, it seems unlikely that very many of these mechanistic studies will ever be retrospectively augmented with computed models; the funding for the resources to do so is unlikely to ever be seen as a priority.

A little more complex than the scheme above, since the reaction also exhibits dependency on acid concentration. Nowadays, there are a number of computer programs available for analysing such complex kinetics, but in 1972 I had to write my own non-linear least squares fitting analysis of the steady state equation to the measured rates[2] This replaced the use of graph paper to analyse (of necessity much simpler) rate equations. The related diazo coupling to activated aryls such as phenol or aniline shows a mechanistic cross-over between an entirely synchronous path in which no Wheland intermediate is involved (e.g. phenol)[22] to one where the intermediate does form (e.g. aniline).[23] Diazo coupling to e.g. benzofuran rather than indole will be reported in a future post.

References

  1. B.C. Challis, and H.S. Rzepa, "The mechanism of diazo-coupling to indoles and the effect of steric hindrance on the rate-limiting step", Journal of the Chemical Society, Perkin Transactions 2, pp. 1209, 1975. https://doi.org/10.1039/p29750001209
  2. H.S. Rzepa, "Hydrogen Transfer Reactions Of Indoles", Zenodo, 1974. https://doi.org/10.5281/zenodo.18777
  3. H.S. Rzepa, "C14H12ClN3", 2015. https://doi.org/10.14469/ch/191707
  4. H.S. Rzepa, "KINISOT. A basic program to calculate kinetic isotope effects using normal coordinate analysis of transition state and reactants.", 2015. https://doi.org/10.5281/zenodo.19272
  5. H. Rzepa, "The mechanism of diazo coupling to indoles", 2015. https://doi.org/10.14469/hpc/176
  6. H.S. Rzepa, "C 14 H 12 Cl 1 N 3", 2015. https://doi.org/10.14469/ch/191705
  7. H.S. Rzepa, "C 14 H 12 Cl 1 N 3", 2015. https://doi.org/10.14469/ch/191698
  8. H.S. Rzepa, "C 14 H 12 Cl 1 N 3", 2015. https://doi.org/10.14469/ch/191713
  9. H.S. Rzepa, "C14H12ClN3", 2015. https://doi.org/10.14469/ch/191712
  10. H.S. Rzepa, "C 19 H 22 Cl 1 N 3", 2015. https://doi.org/10.14469/ch/191723
  11. H.S. Rzepa, "C 19 H 22 Cl 1 N 3", 2015. https://doi.org/10.14469/ch/191719
  12. H.S. Rzepa, "C 19 H 22 Cl 1 N 3", 2015. https://doi.org/10.14469/ch/191721
  13. H.S. Rzepa, "C 19 H 22 Cl 1 N 3", 2015. https://doi.org/10.14469/ch/191720
  14. H.S. Rzepa, "C 19 H 22 Cl 1 N 3", 2015. https://doi.org/10.14469/ch/191722
  15. H.S. Rzepa, "C 19 H 22 Cl 1 N 3", 2015. https://doi.org/10.14469/ch/191717
  16. H.S. Rzepa, "C 19 H 22 Cl 1 N 3", 2015. https://doi.org/10.14469/ch/191726
  17. H.S. Rzepa, "C 19 H 22 Cl 1 N 3", 2015. https://doi.org/10.14469/ch/191714
  18. H.S. Rzepa, "C22H28ClN3", 2015. https://doi.org/10.14469/ch/191715
  19. H.S. Rzepa, "C 22 H 28 Cl 1 N 3", 2015. https://doi.org/10.14469/ch/191706
  20. H.S. Rzepa, "C 22 H 28 Cl 1 N 3", 2015. https://doi.org/10.14469/ch/191709
  21. H.S. Rzepa, "C22H28ClN3", 2015. https://doi.org/10.14469/ch/191718
  22. H.S. Rzepa, "C12H11ClN2O", 2015. https://doi.org/10.14469/ch/191700
  23. H.S. Rzepa, "C12H12ClN3", 2015. https://doi.org/10.14469/ch/191699

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I've started so I'll finish. The mechanism of diazo coupling to indoles – forty (three) years on!

Thursday, December 24th, 2015

The BBC TV quiz series Mastermind was first broadcast in the UK in 1972, the same time I was starting to investigate the mechanism of diazocoupling to substituted indoles as part of my Ph.D. researches. The BBC program became known for the catch phrase I've started so I'll finish; here I will try to follow this precept with the project I started then. Indole diazocoupling In 1972, one measured the rates of chemical reactions to gain insights into the transition state kinetic model. To obtain more data, we used isotopes such as 2H or 3H, together with substituents such as R-t-butyl to modify the potential energy surfaces of the reactions by inducing steric effects.[1],[2] We found that the kinetics for this reaction were actually complex (in part because of pH dependence) involving a Wheland intermediate (the formation of which is shown with red curly arrows above) followed by the collapse of this intermediate to the diazo-coupled product (blue arrows). Coupling to 2-methyl indole (R=X=H, R'=Me), 2-t-butyl indole (R=H, R'=t-butyl) and 4-methyl-2-t-butyl indole (R=Me, R'=t-butyl) revealed that the kinetic isotope effects induced by replacing H by D or T were "not apparent" (i.e. close to 1), the inference being that the rate constant k1 for those systems was slower than k2; the formation of the Wheland intermediate was rate determining (the rds) for the reaction. But with 2-methyl-4,6-di-t-butyl indole (R=t-butyl, R'=Me) this changed and a deuterium isotope effect of ~7 was observed. The rate determining proton removal from the Wheland intermediate k2 was now slower than k1. With 2,4,6-tri-t-butyl indole, we ended by noting that the reaction become almost too slow to observe and furthermore was accompanied by loss of a t-butyl cation as well as a proton. At this point we attempted to infer some transition state models consistent with these observations. Note that we had relatively little data with which to derive our 3D models (one needs to define a geometry using 3N-6 variables, along with its relative energy and force constants). The text and diagram of our attempt is shown below. TS1 The main points of this argument were;

  1. That the Wheland complex is asymmetric, with the diazonium ion adopting a pseudo-axial line of attack.
  2. In contrast, the leaving proton lies closer to the plane of the indole ring
  3. The abstracting base experiences "steric hindrance" if R = t-butyl but not if R' = t-butyl.

I was eager to find out how one might test these models by quantum computation and my next stop in 1974 was to Austin Texas, where Michael Dewar's  group was soon to break the record for computing the geometry of a molecule with 49 atoms (similar in size to the reactions shown above) using the then very new semi-empirical MINDO/3 valence-shell quantum theory. The theory still needed much improvement in a great many aspects and the last forty years has brought us features such as density functional theories, far more accurate all-electron basis sets, superior geometry optimisation methods for transition states, code parallelisation, solvation treatments and increasing recognition that a particular form of electron correlation associated with dispersion energies needed specific attention. These methods would not have become applicable to molecules of this size had the computers themselves not become perhaps 10 million times faster during this period, with a commensurate increase in the digital memories required and decrease in cost. Time then to apply a B3LYP+D3/Def2-TZVP/SCRF=water quantum model to the problem. Four species were computed for each set of substituents; the reactant, a transition state for C…N bond formation (TS1), a Wheland intermediate and a transition state for C-H bond cleavage (TS2). The relative free energies of the last three with respect to the first are shown in the table below. An IRC for R=R'=H (below) was used to show that a bona-fide Wheland intermediate is indeed formed.[3]

IRC animation for TS1, R=R'=H
TS1 IRC
IRC for TS2, R=R'=H
TS2

The relative free energies (kcal/mol) are shown in the table below and the following conclusions can be drawn from this computed model:

  1. For R=R'=H, ΔG298 for TS1 is higher than TS2 (✔ with expt)
  2. With R=t-butyl,R'=Me, ΔG298 of TS1 is 3.1 kcal/mol lower than with R=R'=H. This indicates that t-butyl and methyl groups actually activate electrophilic addition by stabiisation of the induced positive charge, and have no steric effect upon the first step (✔ with our conclusions).
  3. For R= t-butyl,R'=Me, ΔG298 of TS1 is lower than TS2 (✔ with expt).
  4. With R=R'= t-butyl, ΔG298 of TS2 is 4.9 kcal/mol higher than with R=R'=H and is 3.1 kcal/mol higher with R=t-butyl,R'=Me, indicating the steric effect acts on this stage.
  5. The angle of approach of the diazonium electrophile is ~123-118° for R=R'=H and R=R'=t-butyl, about 30° away from a strict pseudo-axial "reactant-like" approach as implied in our sketch above (❌ with diagram above)
  6. The angle of proton abstraction with the plane of the indole ring is 107° for R=R'=H and 100.3° for R=R'=t-butyl, the hydrogen being closer to pseudo-axial than equatorial, relative to the plane of the indole ring  (❌ with diagram above).
  7. The position along the reaction path for proton abstraction is much later with R=R'=t-butyl (rC-H ~1.42Å) than R=R'=H (rC-H ~1.27Å),  (❌ with the statement above: a reactant-like transition state even for the proton expulsion step).
  8. The cross-over between TS1/TS2 as the rds is in the region of the substituents R=Me,R'=t-butyl (~✔ with expt).
  9. The steric interaction occurs not so much between the incoming base and the t-butyl groups, but because of enforced proximity between the t-butyl group and the diazo group induced during the proton removal stage.
  10. The steric effect induced by R=t-butyl is greater than when  R'=t-butyl.
  11. The Wheland intermediate is in a relatively shallow minimum.
R, R' TS1,
ΔG298  k1 		∠ N1-C3-N2 Int
ΔG298  		TS2,
ΔG298  k2 		∠ N1-C3-H ΔΔG
(TS2-TS1) 		kH/kD
(calc)
[4],[5]
R=R'=H 21.4[6],[7] 122.9 19.6[8] 18.6[9] 107.0 -1.8 0.925 (TS1)
R=Me,R'=t-butyl 16.9[10],[11] 121.8 15.2[12] 18.4[13] 101.8 +1.5 0.900 (TS1)
6.4 (TS2)
R=t-butyl,R'=Me 18.3[14],[15] 115.2 16.0[16] 21.7[17] 100.9 +3.4 6.8 (TS2)
R=R'=t-butyl 17.8[18],[19] 117.6 17.8[20] 23.5[21] 100.4 +5.2 6.9 (TS2)

Possible errors in the model:

  1. I have not included any explicit solvent water in which hydrogen bonds to the base (the chloride anion) might moderate its properties.
  2. The ion-pair reactant complex between the phenyl diazonium chloride and the indole has many possible orientations, and these have not been optimised.
  3. The free energies are subject to the usual errors due to the rigid-rotor approximations and other artefacts of partition functions.
  4. Other DFT functionals have not been explored, nor have better basis sets.
  5. This current study is confined to formation of the cis-diazo product.

But even such a model seems to reproduce much of what we learnt about diazocoupling to 2,4-substituted indoles. The calculations you see above took about a week to set up and complete; the original experimental work took (in real-time) ~150 weeks (interleaved with two other mechanistic studies). Also efficient implementation of the quantum theories, together with the computer resources to evaluate the molecular energies and geometries, was almost entirely lacking in 1972 and this has probably only become a realistic project in the last five years or so. So that 43 year wait to finish what I started seems not unreasonable. Nowadays of course, combining experimental kinetic measurements with computational models very often goes hand in hand. It is also worth speculating about the wealth of mechanistic data garnered during the heyday of physical organic chemistry during  the period ~1940-1980. The experiments were not then informed by feedback from computational modelling. However, it seems unlikely that very many of these mechanistic studies will ever be retrospectively augmented with computed models; the funding for the resources to do so is unlikely to ever be seen as a priority.

A little more complex than the scheme above, since the reaction also exhibits dependency on acid concentration. Nowadays, there are a number of computer programs available for analysing such complex kinetics, but in 1972 I had to write my own non-linear least squares fitting analysis of the steady state equation to the measured rates[2] This replaced the use of graph paper to analyse (of necessity much simpler) rate equations. I note that mentions of non-linear least squares methods in kinetic analyses start around 1986[22] Even by 1992, the topic was considered novel enough to warrant a publication[23]

The related diazo coupling to activated aryls such as phenol or aniline shows a mechanistic cross-over between an entirely synchronous path in which no Wheland intermediate is involved (e.g. phenol)[24] to one where the intermediate does form (e.g. aniline).[25] Diazo coupling to e.g. benzofuran rather than indole by the way is also stepwise, but via a very shallow Wheland intermediate[26] and with a higher barrier than indole, making it a very slow reaction.

 

References

  1. B.C. Challis, and H.S. Rzepa, "The mechanism of diazo-coupling to indoles and the effect of steric hindrance on the rate-limiting step", Journal of the Chemical Society, Perkin Transactions 2, pp. 1209, 1975. https://doi.org/10.1039/p29750001209
  2. H.S. Rzepa, "Hydrogen Transfer Reactions Of Indoles", Zenodo, 1974. https://doi.org/10.5281/zenodo.18777
  3. H.S. Rzepa, "C14H12ClN3", 2015. https://doi.org/10.14469/ch/191707
  4. H.S. Rzepa, "KINISOT. A basic program to calculate kinetic isotope effects using normal coordinate analysis of transition state and reactants.", 2015. https://doi.org/10.5281/zenodo.19272
  5. H. Rzepa, "The mechanism of diazo coupling to indoles", 2015. https://doi.org/10.14469/hpc/176
  6. H.S. Rzepa, "C 14 H 12 Cl 1 N 3", 2015. https://doi.org/10.14469/ch/191705
  7. H.S. Rzepa, "C 14 H 12 Cl 1 N 3", 2015. https://doi.org/10.14469/ch/191698
  8. H.S. Rzepa, "C 14 H 12 Cl 1 N 3", 2015. https://doi.org/10.14469/ch/191713
  9. H.S. Rzepa, "C14H12ClN3", 2015. https://doi.org/10.14469/ch/191712
  10. H.S. Rzepa, "C 19 H 22 Cl 1 N 3", 2015. https://doi.org/10.14469/ch/191723
  11. H.S. Rzepa, "C 19 H 22 Cl 1 N 3", 2015. https://doi.org/10.14469/ch/191719
  12. H.S. Rzepa, "C 19 H 22 Cl 1 N 3", 2015. https://doi.org/10.14469/ch/191721
  13. H.S. Rzepa, "C 19 H 22 Cl 1 N 3", 2015. https://doi.org/10.14469/ch/191720
  14. H.S. Rzepa, "C 19 H 22 Cl 1 N 3", 2015. https://doi.org/10.14469/ch/191722
  15. H.S. Rzepa, "C 19 H 22 Cl 1 N 3", 2015. https://doi.org/10.14469/ch/191717
  16. H.S. Rzepa, "C 19 H 22 Cl 1 N 3", 2015. https://doi.org/10.14469/ch/191726
  17. H.S. Rzepa, "C 19 H 22 Cl 1 N 3", 2015. https://doi.org/10.14469/ch/191714
  18. H.S. Rzepa, "C22H28ClN3", 2015. https://doi.org/10.14469/ch/191715
  19. H.S. Rzepa, "C 22 H 28 Cl 1 N 3", 2015. https://doi.org/10.14469/ch/191706
  20. H.S. Rzepa, "C 22 H 28 Cl 1 N 3", 2015. https://doi.org/10.14469/ch/191709
  21. H.S. Rzepa, "C22H28ClN3", 2015. https://doi.org/10.14469/ch/191718
  22. R. Ambrosetti, G. Bellucci, and R. Bianchini, "Direct numerical approach to complex reaction kinetics: the addition of bromine to cyclohexene in the presence of pyridine", The Journal of Physical Chemistry, vol. 90, pp. 6261-6266, 1986. https://doi.org/10.1021/j100281a038
  23. N.H. Chen, and R. Aris, "Determination of Arrhenius constants by linear and nonlinear fitting", AIChE Journal, vol. 38, pp. 626-628, 1992. https://doi.org/10.1002/aic.690380419
  24. H.S. Rzepa, "C12H11ClN2O", 2015. https://doi.org/10.14469/ch/191700
  25. H.S. Rzepa, "C12H12ClN3", 2015. https://doi.org/10.14469/ch/191699
  26. H.S. Rzepa, "C14H11ClN2O", 2015. https://doi.org/10.14469/ch/191730

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